Patent Application
20080218738
In general, the present invention relates to systems and methods that analyze particles in a sample using laser light diffraction. More particularly, the present invention relates to systems and methods that analyze laser light diffraction patterns to determine the size and characteristics of particles in a sample.
The present invention comprises an apparatus for measuring characteristics of particles in a dispersion, as determined from scattered light and particle motion in a fluid, the apparatus comprising a) a sample cell which contains the particle dispersion and which provides optical access for passage of light, b) an acceleration means for producing forces on particles, and c) means for measuring effects of particle motion, caused by said forces, so as to determine accurately a characteristic of said particles.
The invention also comprises a method for determining particle characteristics from a set of measurements of scattered light characteristics, each measurement being performed under a different condition, the method comprising the steps of a) directing light from a light source towards a particle dispersion, b) detecting and measuring light scattered from said particle dispersion, and c) causing motion between said light source and a detection means, and particles along a direction of particle motion, wherein step (b) is performed a plurality of times, each time for a different condition of particles in said dispersion.
The invention also comprises a method for determining a distribution of particle characteristics from a power spectrum of a scatter signal, comprising a) directing light onto a plurality of moving particles, and detecting light scattered from said particles, b) measuring a power spectrum of a scattering signal for various values of acceleration and/or scattering angle of said particles, c) creating a set of simultaneous equations which relate said measured power spectra, which are functions of frequency, scattering angle, and acceleration, to theoretical power spectra, which are functions of frequency, scattering angle, acceleration, and particle characteristics, and to a particle characteristic distribution, and d) solving said simultaneous equations so as to express the particle characteristic distribution in terms of the measured and theoretical power spectra.
Dynamic light scattering has been used to measure particle size by sensing the Brownian motion of particles. Since the Brownian motion velocities are higher for smaller particles, the Doppler broadening of the scattered light is size dependent. Both heterodyne and homodyne methods have been employed to create interference between light scattered from each particle and either the incident light beam (heterodyne) or light scattered from the other particles (homodyne) of the particle ensemble. Heterodyne detection provides much higher signal to noise due to the mixing of the scattered light with the high intensity light, from the source which illuminates the particles, onto a detector. Usually either the power spectrum or the autocorrelation function of the detector current is measured to determine the particle size. These functions are inverted using algorithms such as iterative deconvolution to determine the particle size distribution. This document describes concepts which use a beamsplitter and a mirror or partial reflector to mix the light from the source with light scattered by the particles. This document also describes concepts which use a fiber optic coupler to mix the light from the source with light scattered by the particles.
In
Multiple scattering produces errors in the power spectrum or autocorrelation function of the detector current. Multiple scattering can be reduced by moving the focus of lens 103 to be close to the inner surface (the interface of the dispersion and the window) of the sample cell window. Then each scattered ray will encounter very few other particles before reaching the inner window surface. Particles far from the window will show multiple scattering, but they will contribute less to the scattered light because pinhole 112 restricts the acceptance aperture, which will capture a smaller solid angle of scattered light from particles which are far from the inner window surface. If the sample cell is a removable cuvette, multiple scattering will be reduced as long as the short distance of inner window surface to the focal point (in the dispersion) of lens 103 is maintained by appropriate position registration of the cuvette.
This design can provide very high numerical aperture at the sample cell, which improves signal to noise, reduces multiple scattering, and reduces Mie resonances in the scattering function. Light polarization is also preserved, maximizing the interference visibility.
In some cases, the beam focus will define an interaction volume, in the dispersion, which is too small to contain a statistically significant number of particles. The interaction volume is the volume of the particle dispersion which contributes to the scattered light collected by the optics. In particular, a sample of larger particles at low concentration may not be representative of the total sample if the exchange of particles in and out of interaction volume is slow. In this case a larger interaction volume is required to maintain sufficient particles in the beam. So changing the beam focus size and divergence may be appropriate in some applications.
Another aspect of
Also notice that a lens and a pinhole have been removed in
Another issue is the shift in the heterodyne spectrum due to convection currents in the sample. This is usually small when the divergence of the beam focus is low and the focus is close to the interface between the dispersion and the window. However, this problem may be reduced by surrounding the interaction volume with a chamber as shown in cross-section drawing in
All of these configurations can generate a local oscillator for heterodyne detection using the following methods. In all cases the reflector, which generates the local oscillator, must be held in a stable location relative to the rest of the interferometer:
One of the key advantages of this invention is that the beam focus in the dispersion does not need to be coincident or near to a partially reflecting surface, such as the inner surface of a cuvette. If the inner surface of cuvette is not close to the beam focus in the dispersion, very little of the reflection from that surface will be returned through pinhole 112 to contribute interferometric noise from small motion of that surface. This allows the use of inexpensive cuvettes whose poor tolerances may not accommodate the requirements of the optical interferometry in the systems shown above.
Another advantage of these designs is the ease of alignment. All of the components in each design can be positioned to within standard machining tolerances. Only two components need alignment during manufacture: the pinhole and/or the local oscillator reflector. These systems have the following advantages over fiber optic systems:
better interferometric efficiency in both polarization and coherence
more flexibility for choice of scattering angle
better photometric efficiency
better control over the local oscillator level
higher numerical aperture in the scattering volume to reduce multiple scattering and increase scatter signal level simple adjustment of scattering volume numerical aperture and position in the sample
adjustable scattering volume
lower multiple scattering
lower cost
In the cases where fiber optic systems may have other advantages (such as electromagnetic immunity when using remote sensing) these designs can be changed to gain some of the advantages which are listed above. The following describes some concepts for fiber optic systems.
The basic fiber optic interferometer is illustrated in
Placing a reflective layer on the tip of the fiber could require placing the entire fiber optic coupler into a vacuum chamber for evaporated or sputtered coatings. The design shown in
The male/male connector assembly is easily manufactured by butting two male connectors, back-to-back, through a sleeve and pushing a fiber through the entire assembly. This fiber is potted and end polished in both connectors using standard techniques.
Other types of optical systems could also be attached to this port. An example of a probe attachment for insertion directly into the dispersion is shown in
Another attachment design could use all anti-reflection coated optics, without the partially reflecting surfaces, to completely eliminate any local oscillator source, for homodyne detection.
Also note that in all of the heterodyne designs with the local oscillator reflector in the scatter sensing arm, the optical path difference between the scatter light path and the local oscillator path (the difference between the optical path length from the local oscillator partial reflector to the detector and the scattering particle to the detector) must be less than the coherence length of the light source to provide sufficient interferometric visibility.
For both the fiber optic and non-fiber optic systems, the local oscillator reflection can be generated at certain surfaces. All other surfaces may be tilted and/or anti-reflection coated so as to contribute minimal interferometric signal on the detector. In both the fiber and non-fiber systems, the source beam is focused within the cuvette (or sample cell). If the focused point is far into in the dispersion (see
This positional registration is even more critical when the beam focus is at the inner surface of the cuvette (the surface contacting the dispersion) and the reflection from that surface is used to generate the local oscillator (see
For small particles, the heterodyne signals will be buried in laser source noise.
I1=sqrt(R*T*Rm*Io(t)*Is(t))*COS(F*t+A)+R*T*Rm*Io
I1=sqrt(R*T*Rm*Io(t)*SR*T*Io)*COS(F*t+A)+R*T*Rm*Io
I2=K*Tm*Io(t)
where:
I1 and I2 are normalized (detector responsivity=1).
COS(x)=cosine of x
K is a constant which describes the ratio of other efficiencies (optical and electrical), between the I1 and I2 channels, which are not due to the beamsplitter and partial reflecting mirror.
R and T are the reflectivity and transmission of the beamsplitter, respectively.
Rm and Tm are the reflectivity and transmission of the partially reflecting mirror, respectively.
sqrt(x)=square root of x
Io(t) is the source beam intensity as function of time t
F is the heterodyne beat frequency at a heterodyne detector due to the motion of the scatterer which produces Is(t). And A is an arbitrary phase angle for the particular particle.
Is(t) is the scattered light intensity from the particle:
Is(t)=S*R*T*Io(t) where S is the scattering efficiency for the particle. S includes the product of the scattered intensity per incident intensity and optical scatter collection efficiency.
The light source intensity will consist of a constant portion Ioc and noise n(t):
Io(t)=Ioc+n(t)
We may then rewrite equations for I1 and I2:
I1=R*T*sqrt(S*Rm*(Ioc+n(t))*COS(F*t+A)+R*T*Rm*(Ioc+n(t))
I2=K*Tm*(Ioc+n(t))
If we use high pass filters to only accept only the higher frequencies, which contain the size information, we obtain high pass signals for I1 and I2:
I1hp=R*T*sqrt(S*Rm)*Ioc*COS(F*t+A)+R*T*Rm*n(t)
I2hp=K*Tm*n(t)
Where we have assumed that n(t) is much smaller than Ioc. And also n(t) is the portion of the laser noise that is passed by the high pass filter bandwidth (see below). In certain situations, these high pass filters are replaced by band pass filters which only pass frequencies carrying particle information.
The laser noise can be removed to produce the pure heterodyne signal, Idiff, through the following relationship:
Idiff=I1hp−(R*T*Rm)/(K*Tm)*I2hp=R*T*Sqrt(S*Rm)*Ioc*COS(F*t+A)
This relationship is realized by high pass filtering of each of the I1 and I2 detector currents. One or both of these filtered signals are amplified by programmable amplifiers, whose gains and phase shifts are adjustable. The difference of the two outputs of these amplifiers is generated by a difference circuit or differential amplifier. With no particles in the beam, the gain and phase shift of at least one of the programmable amplifiers is adjusted, under computer or manual control, to minimize the output of the difference circuit (i.e. (gain I2)*R*T*Rm/(K*Tm)=1). At this gain, the source intensity noise component in the heterodyne detector beat signal, with particles present, is removed in the difference signal, which is fed to an analog to digital converter (A/D), for inversion to particle size.
This entire correction could be accomplished in the computer by using a separate A/D for each filtered signal and doing the difference by digital computation inside the computer. The phase and gain adjustments mentioned above, without particles in the beam, could be accomplished digitally. Then the coefficient ratio R/K can be calculated to be used in the equation for Idiff, using the following equation:
R*T*Rm/(K*Tm)=I1dc/I2dc
Where I1dc and I2dc are the DC offsets of the unfiltered signals I1 and I2, respectively.
If both signals were digitized separately, other correlation techniques could be used to reduce the effects of source intensity noise. In any case, the beamsplitter reflection is adjusted to obtain shot noise limited heterodyne detection, with excess laser noise removed by the difference circuit or difference calculation shown above.
These noise correction techniques can be applied to any heterodyning system by simply adjusting the filtering of currents I1 and I2 to pass the signal of interest, while blocking the low frequency component (Ioc) of Io(t). Excess laser noise and other noise components, which are present in both the heterodyne signal and the light source, can be removed from the signal of interest through this procedure. One application is dynamic light scattering, where the heterodyne signal is contaminated by laser source noise in the optical mixing process. The filters on I1 and I2 would be designed to pass the important portion of the Doppler broadened spectrum and to remove the large signal offset due to the local oscillator. Then by using the subtraction equation for Idiff, described previously, the effects of laser noise can be removed from the Doppler spectrum, improving the particle size accuracy. In the case of fiber optic heterodyning systems, the laser monitor current, I2, could be obtained at the exit of the unused output port (port 1903 in
Using
P2bkg=power spectrum measured at port 1912 with clean dispersant (without particles) in the sample region
P3bkg=power spectrum measured at port 1903, while P2bkg is being measured on port 1912
P2meas=power spectrum measured at port 1912 from the particle dispersion (with particles) in the sample region
P3meas=power spectrum measured at port 1903, while P2meas is being measured on port 1912
I3dc=DC offset or constant portion of signal producing P3meas
I2dc=DC offset or constant portion of signal producing P2meas
Then the measured power spectrum, P2meas, can be corrected for the background power spectrum and the drift in the background power spectrum by using the following equations, where P(f˜0) is the power spectral density at frequencies close and equal to zero:
Pcorrected=P2meas−P2bkg−((I2dc/I3dc)̂2)*(P3meas−P3bkg)
or
Pcorrected=P2meas−P2bkg−(P2meas(f˜0)/P3meas(f˜0))*(P3meas−P3bkg)
The background corrected power spectrum, Pcorrected, would then be inverted to obtain the particle size distribution.
The correction described previously for Idiff removes common mode noise between the scattered heterodyne signal and the laser monitor. This correction is made directly to the signal. While this technique is useful in the case of dynamic light scattering and many other heterodyne systems, another method may be more easily implemented to correct the power spectrum in dynamic light scattering, for the noise component due to laser noise. In most cases the local oscillator is adjusted to provide shot noise limited detection, However, usually some excess laser noise (included in laser noise in the following description), beyond the shot noise, is observed. We will start with some definitions for power spectral densities which are all functions of frequency f:
Psd=total power spectral density of the scattering detector (detectors 501, 601, 701 for
Psc=power spectral density component of the scattering detector current due to particle scattering
Pssh=shot noise component of power spectral density of the scattering detector
Psls=laser noise component of power spectral density of the scattering detector
Pld=total power spectral density of the laser monitor detector (detectors 502, 602, 702 for
Plsh=shot noise component of power spectral density of the laser monitor detector
Plls=laser noise component of power spectral density of the laser monitor detector
Ios=mean detector current of the scattering detector
Iol=mean detector current of the laser monitor detector
Pssh=2*e*(Ios) (scatter detector shot noise)
Plsh=2*e*(Iol) (laser monitor detector shot noise)
Where e is the electron charge
Psls=B*g(f,ic)*((Ios)̂2) (scatter detector laser noise component)
Plls=B*g(f,ic)*((Iol)̂2) (laser monitor detector laser noise component)
Since these noise sources and scattering signals are uncorrelated, the following equations hold:
Psd=Psc+Pssh+Psis
Pld=Plsh+Plls
Psd=(Psc+2*e*(Ios)+B*g(f,ic)*((Ios)̂2))*Gs(f)
Pld=(2*e*(Iol)+B*g(f,ic)*((Iol)̂2))*Gl(f)
Where B is a constant, which describes the ratio of noise power to square of the average current, and g(f,ic) is the spectral function for laser noise, f is frequency and ic is laser current. Gs(f) and Gl(f) are the electronic spectral gain of the detector electronics for the scatter detector and laser monitor detector, respectively.
From these last two equations, we want to determine Psc, the power spectrum component due to the light scattered from the particles. Solving these two equations for Psc, we obtain:
Psc(f)=(Psd(f)/Gs(f))−(2*e*(Ios))−(((Pld(f)/Gl(f))−(2*e*(Iol)))*((Ios)̂2)/((Iol)̂2))
This equation assumes that the excess laser induced amplitude noise (noise in excess of the shot noise) is proportional to the mean detector current due to the laser. This assumption is described by the proportionality to the square of the mean detector currents of power spectral density in the following equations:
Psls=B*g(f,i)*((Ios)̂2) (scatter detector laser noise component)
Plls=B*g(f,i)*((Iol)̂2) (laser monitor detector laser noise component)
However, in general the excess noise components may have a more complicated and unknown dependence given by the function gn:
Psls=B*gn(f,i,Ios) (scatter detector laser noise component)
Plls=B*gn(f,i,Io1) (laser monitor detector laser noise component)
In this case, the functional dependence gn(f,i,I) could be determined by measuring Psls and Plls at various levels of Ios and Iol. Since the function gni(f,i,I) could possibly change between lasers, an easier method is to adjust the mean detector currents, Ios and Iol, to be equal with a variable optical attenuator, such as two polarizers with adjustable rotation angles. This attenuator could be placed on front of either the heterodyne detector or the laser monitor detector (as shown by detector 1913 in
Psc=(Psd/Gs(f))−((Pld/Gl(f))
Another method is to measure Psd and Pld without any particles in the beam and calculate the ratio RT as a function of frequency:
RT(f)=Psd(f)/Pld(f) measured without particles in the sample volume
Then Psc(f)=Psd(f)−(RT(f)*Pld(f)) measured with particles in the sample volume
This is only an estimate to the true correction, but it may work well in cases where the excess noise and mean detector currents do not vary significantly.
Notice: any products, divisions, additions, or subtractions in this document between functions (or vectors) are assumed to be inner operations (i.e. the function(x) values at each value of x are multiplied, divided, added, or subtracted).
The noise correction can also be determined from background measurements and assumptions for the form of the power spectral density for the particles and for the noise. The power spectrum of the scatter detector current from particles under Brownian motion takes the form:
P(f)=4*Io*Is*(K/pi)/(f̂2+K̂2) for particles of a single size
Where
x̂2 is the square of quantity x
pi is constant pi
P(f) is the power spectral density of the detector current
f is the frequency of the detector current
Io is the detector current due to the local oscillator intensity
Is is the detector current due to the mean scattered light intensity
K is a constant which is particle size dependent
The total power spectral density measured from a group of particles is given by:
Pt(f)=SUMj(4*Io*Isj*(Kj/pi)/(f̂2+Kĵ2))+Pb(f)
Where the SUMj is over each jth particle with scattering Isj and constant Kj.
Pb(f) is the power spectral density of the detector current due to background such as excess laser noise and shot noise. Pb(f) is usually measured by scatter from clean dispersant without particles. Examination of these equations provides the following approximations:
Pt(∞)=Pb(f˜∞)
Pb(∞)=B at high frequencies, the background spectrum is white
The spectral density Pb=constant at very high frequencies
Pt(−∞)=A/(f̂2+C)+B at moderately high frequencies f>>Kj
Where A, B, and C are constants to be determined.
This dependence is illustrated in
Pt(f1)=A/(f1̂2+C)+B
Pt(f2)=A/(f2̂2+C)+B
Pt(f3)=A/(f3̂2+C)+B
Where Pt(f1) is the mean power spectral density in the band about frequency f1, and likewise for f2 and f3.
If the frequency bands are at very high frequencies then f̂2 is much greater than C and the following two simultaneous equations can be used to solve for B:
Pt(f1)=A/(f1̂2)+B
Pt(f2)=A/(f2̂2)+B
And B is then given by:
B=(P(f1)*f1̂2−P(f2)*f2̂2)/(f1̂2−f2̂2)
Usually B is not a stable value and can change between successive digitized data sets (digitization of the detector current over a certain measurement period) and their corresponding power spectral density calculations. However, the calculation, shown above, will determine the specific value of B for each data set and calculation of Pt(f) for that data set.
Pb(f) can be calculated from the value of B by using the following procedure. Measure Pb(f) and B from the background signal of clean dispersant without particles. In this case B is simply the value of Pb(f) at a very high frequency where Pb(f) has a white noise spectrum. Let Bo=B and Pbo(f)=Pb(f) from this clean dispersant measurement. Then when Pt(f) and B are measured from a particle dispersion by the method described previously, Pb(f) can be determined by:
Pb(f)=Pbo(f)−Bo+B
Pb(f) can also be calculated from a function of B or by using a lookup table, either which can be produced by many measurements of Pb(f) for various values of B, by simply monitoring the instrument for a few days under different starting and environmental conditions. For example Pb(f) could be fit to a polynomial, in f, whose coefficients are functions of B:
Pb(f)=B+G1(B)*f+G2(B)*f̂2+G3(B)*f̂3+ . . . .
And then the power spectrum of the signal component due to particle scattering is given by subtracting the background power spectrum, Pb(f) (calculated from the polynomial and B), from the measured power spectrum Pt(f):
Pp(f)=Pt(f)−Pb(f)
This power spectral density Pp(f) can then be inverted to produce the particle size distribution or it can be integrated on a logarithmic scale for deconvolution. This process can also be used directly with the logarithmic scale power spectral data. On the logarithmic frequency scale the following variable transformations are made:
x=ln(f) (ln is the natural logarithm)
f=exp(x)
Then creating the power spectrum on the logarithmic scale, R(x) we obtain:
R(x)=Pt(f)*∂f/∂x=f*Pt(f)=P1(x)=A/(exp(x)+Cexp(−x))+B*exp(x)
We can now measure the power in three logarithmic frequency bands, analogous to f1, f2 and f3 in the previous description. For example the three simultaneous equations now become:
R(x1)=A/(exp(x1)+Cexp(−x1))+B*exp(x1)
R(x2)=A/(exp(x2)+Cexp(−x1))+B*exp(x2)
R(x3)=A/(exp(x3)+Cexp(−x3))+B*exp(x3)
Where R(x) is the spectral power in the logarithmic frequency band at logarithmic frequency x=ln(f). And A, B, and C are new constants to be determined from solution of the simultaneous equations and B*exp(x) is the white noise background to be subtracted from the power spectrum measured in analogy to the linear frequency case described above. Rb(x) can be calculated from the value of B by using the following procedure. Measure Rb(f) and B*exp(x) from the background signal of clean dispersant without particles. In this case B*exp(x) is simply Rb(x) at a very high frequency where Pb(f) has a white noise spectrum. Let Bo=B and Rbo(x)=Rb(x) from this clean dispersant measurement. Then when Rt(x) and B are measured from a particle dispersion by the method described previously and the simultaneous equations are solved for B, Rb(x) can be determined by:
Rb(x)=Rbo(x)−Bo*exp(x)+B*exp(x)
Rp(x)=Rt(x)−Rb(x)
Rp(x) is the portion, of the power spectrum on the logarithmic frequency scale, which is due to particle scatter. Rp(x) is deconvolved by known methods to produce the particle size distribution.
In all of the power spectrum methods described above, all of the digitized signal samples collected from the particle dispersion consist of a group of data sets, which are collected sequentially. Each data set consists of a group of sequential digitized samples of the signal. In all of the cases described above, the power spectrum for each data set is corrected by calculations using measurements made during that set of digitized signal samples. The change of the power spectrum background should not be significant during any one data set, so that the power spectrum from each data set is corrected using the most accurate correction parameters present during the period of that data set. All of these corrected power spectra are then added together to obtain the final corrected power spectrum. This could also be accomplished by adding up all of the uncorrected power spectra and all of the corrections (corrected background to subtract from the measured power spectrum), and then subtract the sum of corrected backgrounds from the sum of measured power spectra to obtain the final corrected power spectra. The only requirement is that the corrections must be calculated at sufficiently short intervals such that the background characteristics can be accurately described by one set of parameters during any single data set, even though the background may be changing significantly during the entire data collection period.
Another improvement to signal to noise can be gained by analog filtering of the scatter signal before signal digitization and calculation of the power spectrum. The following equation describes the power spectral density of the scatter detector current, as described before:
P(f)=4*Io*Is*(K/pi)/(f̂2+K̂2)
This function is maximum at f=0 and drops off at higher frequencies as shown in
Another method to reduce noise in the scatter signal is to measure self-beating (homodyning) instead of heterodyning.
This system is designed to measure dynamic light scattering in the homodyne mode, without a local oscillator which usually causes scatter signal noise. Both detectors only see scattering from the interaction volume which could be very close to the inner concave surface, providing very short optical path for scattered rays and reduced multiple scattering at high particle concentrations. This configuration may have advantages when measuring very small particles whose scattering signal is lost in the fluctuations of the background signal caused by small fluctuations in the large local oscillator needed for heterodyne detection. However, in some cases (larger particles for example), heterodyne detection is still the optimal detection means.
Another configuration for using the design, shown in
One source of signal noise in fiber optic dynamic light scattering systems is interferometric noise due to motion of the optical fibers. This noise can occur in both single and multimode fiber optics and couplers.
In some cases, very large particles can contribute scatter signals which will distort the signals from smaller particles. In this case, particle settling could be used to remove larger particles from the interaction volume, as shown in
As mentioned before, one cause of laser noise is laser light which is reflected back into the laser.
The basic fiber optic interferometer is illustrated in
Other designs for port 1004 could incorporate a window, on the surface of the GRIN rod, which contacts the particle dispersion directly.
The port 1002 detector current is digitized for analysis to determine the particle size in the dispersion. The power spectrum of the optical detector current contains a constant local oscillator and a frequency dependent component. The frequency dependent component is described by the following equations:
P(f)=(S(d,a,nm,np)̂2)*(D*K̂2)/(4pî2*(f)̂2+(DK̂2)̂2)+n(f)
where
P(f)=power spectral density of the detector current (or voltage) at frequency f
S=scattering efficiency per unit particle volume
d=particle diameter
eta=dispersant viscosity
f=frequency
np=refractive index of particle
nm=refractive index of dispersant
a=scattering angle
c=constant which depends on dispersant viscosity and particle shape
̂2=square of quantity
g=acceleration
k=Boltzman's constant
T=dispersant temperature
w1=wavelength of the source light
n(f)=baseline noise power spectral density
This equation describes the power spectrum from a single particle of diameter d. For groups of particles of various sizes, the power spectrum is the sum of the spectra from the individual particles. Then the total spectrum must be deconvolved to find the particle size distribution. Usually the spectrum from clean dispersant is measured to determine n(f), which is the portion of the spectrum due to laser noise, detector noise, modal interference due to fiber optic vibrations, and other noise sources. This baseline noise is the power spectrum measured without any particles in the dispersant. This baseline noise spectrum is subtracted from the power spectrum measured from the particles to determine the spectrum which is only due to Brownian motion of the particles. However, n(f) is not usually stable during the period required to gather sufficient digitized data to create an accurate estimation of the power spectrum.
One useful property of the fluctuating portion of the baseline noise is that the noise is nearly white and shows strong correlation with values of n(f) at high frequencies. As shown by the equation for P(f), the power spectrum component due to light scattered from the particles drops off very rapidly at high frequencies and becomes negligible as compared to n(f) at high frequencies. At high frequencies, the particle scatter portion of the spectrum drops as 1/f̂2. In any event the detector current could be sampled at sufficiently high frequencies to measure the power spectrum where the contribution from the particles is small.
One method for noise correction is to generate an empirical set of n(f)'s by measuring n(fp) in the frequency region where the particles contribute to P(f) while also measuring n(fh)) at high frequencies where the particle contribution would normally be small. So various P(f) samples are measured without particles to generate a function G:
n(fp)=G(n(fh))
The portion of the spectrum n(fh) could be measured from the calculated power spectrum of the digitized data. But then the detector current must be sampled at rates well beyond those required to measure the particles. The value for n(fh) could also be measured by band pass analog filters and power circuits, to generate the total power in a bandpass in frequency regions which capture frequencies where the particles will have very small contributions.
In either case, once the function G(n(fh)) is created, it can be used to correct the spectrum measured from particles by measuring n(fh) each time a data segment is recorded by digitizing the scatter detector current for a short period and an FFT is created to produce the contribution of this short period signal to the total power spectrum of the entire measurement period. This particular ni(fp)=G(ni(fh) is then subtracted from the Pi(f) for the ith data segment to correct that data segment for the n(f) during that segment. In this way, as ni(f) fluctuates, the ith data segment is corrected precisely for the noise in that segment. This could also be accomplished by summing all of the Pi(f)'s over i to get Pt(f) and all of the ni(f)'s over i to get nt(f) and then using Pt(f)−nt(f) to calculated the spectrum contribution from the particles.
G(n(fh) could also be determined from data points in both the upper fp, and fh regions to produce better conditioning of the simultaneous equations used to solve for the parameters in the function G. In any case, if the fluctuating component of n(t) is white noise and is flat out to fh, then the correction is simple because n(fp)=n(fh). But in general, a function G may be required to get precise correction over the entire range of fluctuations. G can take the form of a polynomial function of f (over both regions fp and fh) or a group of n(fp) functions in a look-up table, where interpolation between the 2 table n(fp) functions, with the closest corresponding values for n(fh) to the measured value of ni(fh), would be used to determine the ni(fp) for the ith data segment. In some cases, G will be proportional to the inverse of the square-root of frequency f.
This correction procedure is only required in the frequency regions where the fluctuations in n(f) cause unacceptable errors in the calculated particle size distribution. Typically this will be in the higher frequency end of the fp region, where the smaller particle information is contained. At lower frequencies, a single measurement of n(f) before or after the particle measurement may be sufficient, without using G.
Another method which may be utilized is to solve entire the problem in a generalized fashion. This method would use all of the power spectrum data, P(fp) and P(fh), to solve for the particle contribution and baseline contribution using an iterative procedure (optimization or search algorithm) which assumes the existence of both. However, the G function method described above may be more effective because more apriori knowledge is provided to the algorithm.
These methods can be applied to the power spectrum on any frequency scale, including but not limited to a logarithmic progression in f. However, if the fluctuating portion of the baseline noise is nearly white or uniform in density, then a linear scale in f may be optimal for calculation of G.
The background can be solved for as part of the total solution in this background drift problem and many other similar problems where a system model is inverted to solve for the particle size distribution. Consider the generalized model below:
F=H*V
Where F is the measured data (power spectrum of scattered light signal, angular distribution of scattered light, etc.), V is the size distribution to be solved for, and H is the matrix which describes the system model (Brownian motion/Doppler effect, angular light scattering, etc.). This model is usually inverted to produce the size distribution:
V=F/H (a matrix inversion, not a literal division)
Where F/H represents the solution of the matrix equation by any means including iterative techniques with constraints on the values of V. The actual values for F are calculated by subtraction of the actual background from the measured FB, which includes the background.
FB_measured=F_actual+B_actual
Where F and B are the actual scattering data and the background (without particles), respectively.
However the computed values (called Fc) for F use the measured values of B which may differ from the actual values of B (due to drift of B) by the error vector E.
B_actual=B_measured+E
Fc=FB_measured−B_measured
Fc=F_actual+E
Then the matrix equation above becomes:
Fc−E=H*V
Solving this matrix equation for V, we obtain
V=(Fc−E)/H (/ is not a literal division,/represents solution of the matrix equation above for V)
If V has m unknowns, F has n measured values, and E is described by k number of parameters, then V and E can be solved from this equation as long as m+k≦n. This method works well when E is much smaller than B_measured so that the correction E is small and accurately described using only a few parameters. For example, in the previous case, E could be simply white noise times a constant which determines the amount of white noise which must be added to the noise background, which was measured without particles in the source beam. E is determined to obtain the best result for V, or in other words the result which minimizes the RMS error:
SQRT(SUM(((Fc−E)−(H*V))̂2))
Where SUM is the summation over the vector elements. This function can be minimized by known iterative methods, such as simply changing E and inverting Fc−E=H*V multiple times and choosing the result for V and E which minimizes the RMS error above.
Semiconductor processes require very clean fluids with less than one 0.1 micron particle per cubic meter. The light scattered by a particle of this size can be detected as it passes through a focused laser beam. However at 10 meters per second flow rate, interrogation of a cubic meter of fluid would consume over 3 years through a laser volume of 1000 cubic microns (cubic volume of 10 microns on each side). This invention describes an apparatus for detecting the presence of one particle per cubic meter at a rate of 1 cubic meter per hour. The system is shown in
A light source is projected into a sample flow tube by lens 3201, as shown in
The major advantage of this system is the large cross-section of the interrogated volume in the sample flow tube and the long interaction distance within the tube, which could be meters in length. The two normalized (detector responsivity=1) detector currents, I1 from detector 3221 and I2 from detector 3222, can be described by the following equations:
I1=sqrt(R1*T1*R*Io(t)*Is(t))*COS(F*t+A)+R1*T1*R*Io
I2=K*R1*Io(t)
where:
COS(x)=cosine of x
K is a constant which describes the ratio of other efficiencies (optical and electrical), between the I1 and I2 channels, which are not due to the beamsplitters. R and T are the reflectivity and transmission of beamsplitter 3212, respectively. R1 and T1 are the reflectivity and transmission of beamsplitter 3211, respectively.
sqrt(x)=square root of x
Io(t) is the source beam intensity as function of time t
F is the heterodyne beat angular frequency at detector 3221 due to the motion of the scatterer in the flow tube. And A is an arbitrary phase angle for the particular particle. Is(t) is the scattered light intensity from the particle:
Is(t)=S*T1*R1*T*T*Io(t) where S is the scattering efficiency for the particle. S includes the product of the scattered intensity per incident intensity and optical scatter collection efficiency.
The light source intensity will consist of a constant portion Ioc and noise n(t):
Io(t)=Ioc+n(t)
We may then rewrite equations for I1 and I2:
I1=R1*T1*T*sqrt(S*R)*(Ioc+n(t))*COS(F*t+A)+R1*T1*R*(Ioc+n(t))
I2=K*R1*(Ioc+n(t))
The heterodyne beat from a particle traveling with nearly constant velocity down the flow tube will cover a very narrow spectral range with high frequency F. For example, at 1 meter per second flow rate, the beat frequency (F/(2pi)) would be in the megahertz range. If we use narrow band filters to only accept the narrow range of beat frequencies we obtain the narrow band components for I1 and I2:
I1nb=R1*T1*T*sqrt(S*R)*Ioc*COS(F*t+A)+R1*T1*R*n(t)
I2nb=K*R1*n(t)
where we have assumed that n(t) is much smaller than Ioc.
The laser noise can be removed through the following relationship:
Idiff=I1nb−(T1*R/K)*I2nb=R1*T1*T*Sqrt(S*R)*Ioc*COS(F*t+A)
This relationship is realized by narrowband filtering of each of the I1 and I2 detector currents. One or both of these filtered signals are amplified by programmable amplifiers, with adjustable gains. The difference of the two outputs of these amplifiers is generated by a difference circuit or differential amplifier. With no particles in the beam, the gain of at least one of the programmable amplifiers is adjusted, under computer or manual control, to minimize the output of the difference circuit. At this gain (for example gain I2=K/(T1*R)), the source intensity noise component, in the detector 3221 beat signal, is removed from the difference signal Idiff which is fed to an analog to digital converter (A/D), through a third narrowband filter, for analysis to sense the beat signal buried in noise. This filtered difference signal could also be detected by a phase locked loop, which would lock in on the beat frequency of current from detector 3221.
Beamsplitter 3212 reflection is adjusted to obtain shot noise limited heterodyne detection, with excess laser noise removed by the difference circuit. This entire correction could be accomplished in the computer by using a separate A/D for each filtered signal and doing the difference by digital computation inside the computer. If both signals were digitized separately, other correlation techniques could be used to reduce the effects of source intensity noise. The advantage of this measurement is that the high frequency beat signal is produced for the duration of the particle's residence in the long flow tube. This tube could be meters in length. This could produce millions of beat cycles during the particle's transit, allowing phase sensitive detection in a very narrow bandwidth at megahertz frequencies, well above any 1/f noise sources. The power spectrum of a data set consisting of a large number of signal cycles will have a very narrow spectral width, which can be discriminated against broad band noise, by using the computed power spectrum of the signal and spectral discrimination algorithms. For example, a 1 meter long tube, with flow at 1 meter per second, will produce a heterodyne signal with a Fourier spectrum which consists of a narrow peak, with center in the megahertz range and a spectral width of a few Hertz. This signal can easily be retrieved from broadband noise by narrowband filtering or spectral analysis of the signal. If the flow variation (and Doppler frequency variation) is significant, a broader band analog filter could be used with spectral discrimination analysis of the digitized signal. For example, if the flow rate were 1 meter per second with a 1 meter flow tube, the heterodyne signal could be broken up and digitized in approximately 1 second data segments. Based upon the known variation in flow rate over long periods, the heterodyne signal would be filtered with a bandpass which covers the entire range of Doppler frequencies which span the entire flow rate variation. The Fourier transform or power spectrum of each 1 second data segment is then analyzed to find a narrow spectral peak somewhere in the broader bandpass of this filter. While the center frequency of this peak may drift with flow rate over long periods, over any 1 second period the flow will be sufficiently constant to produce a narrow Doppler spectrum which can easily be discriminated against the broad band noise, because the spectral density of the narrow peak will be higher than that of the noise. This narrow spectrum can be insured by controlling the flow rate to be nearly constant during each particle transit time through the flow tube. The pumping system could consist of a pressurized tank (with regulator), with a flow restriction (orifice) on the outlet. The flow through this orifice may vary slowly over long periods, but over 1 second periods, the flow will be very constant, without the short term variations introduced by pumps with mechanical frequencies greater than 1 hertz.
Another system for noise reduction is shown in
S1=sqrt(S*T1)*(Ioc+n(t))*COS(F*t+A1)+T1*(Ioc+n(t))
S2=sqrt(S*T2)*(Ioc+n(t))*COS(F*t+A2)+T2*(Ioc+n(t))
Where T1 and T2 account for optical reflection and transmission differences between the two detector systems. After electronic filtering (either bandpass filtering at the beat frequency or high pass filtering, with cutoff below the beat frequency) we obtain the filtered version for each signal:
S1f=sqrt(S*T1)*Ioc*COS(F*t+A1)+T1*n(t)
S2f=sqrt(S*T2)*Ioc*COS(F*t+A2)+T2*n(t)
Then we use an adjustable gain, G, (and adjustable phase if needed) on one signal to balance these two detection channels. Here we have assumed that Ioc is much larger than n(t). The difference circuit, diff in
deltaS=S2f−G*S1f
The gain G can be adjusted for minimum deltaS when no particles are in the flow tube (note: this same electronic design could be used to process the signals from detector 3221 and detector 3222 in
A1−A2=mπ where m is an odd integer
When these two conditions are satisfied, the following equations will be satisfied:
G=T2/T1
A1−A2=mπ
deltaS=sqrt(S*T2)*Ioc*COS(F*t+A1)+T2*n(t)−(sqrt(S*T2)*Ioc*COS(F*t+A1−mπ)+T2*n(t))
and since COS(x−mπ)=−COS(x) for m odd
deltaS=2*sqrt(S*T2)*Ioc*COS(F*t+A1)
deltaS will be the pure beat signal from the moving particle without excess laser noise effects. However, residual noise sources which are not common to both channels may not be totally eliminated, such as shot noise of the individual detectors. But Ioc can be adjusted to sufficiently high level to provide shot noise limited heterodyne detection for both detectors, with common mode noise eliminated by the differential measurement. The residual noise can be reduced by using power spectrum calculation, correlation, or matched filters for the sinusoid at the beat frequency, which can be calculated from the flow velocity.
Laser phase noise is another possible error source. However, for systems with flow tube lengths less than 1 meter (total maximum optical path differences below 2 meters), the phase noise, even from the worst sources (laser diodes), will be below 1 milliradian RMS. This noise will be much lower for gas lasers such as HeNe lasers. If laser phase noise (or short laser coherence length) is a problem, the optical paths for mirror 3311 and mirror 3312 can be extended to match the average optical path for the scattering particle during travel of the particle down the flow tube. For example, if a particle at the middle of the transit down the tube is approximately 0.5 meter from the midpoint between the beamsplitters, then the mirrors should be placed 0.5 meter away also. This could also be accomplished by using coiled single mode fiber optics, with coupling lens and reflecting end, to extend the optical path of the mirror arms in a compact space. Otherwise, the open air mirror arm paths could run parallel to the flow tube to minimize the total volume of the detection system. Also lasers must be chosen with coherence lengths longer than the optical pathlength difference of each interferometer arm. This pathlength difference is slightly longer than twice the length of the active flow tube section, if the mirror arms are not extended.
Certain laser diodes and most gas lasers have coherence lengths greater than 2 meters so that each particle will produce more than a million beat frequency cycles during one passage through a 1 meter long flow tube. But shorter or longer tubes will also work well, as long as the source meets the coherence length requirements.
The signal to noise is maximized by using a narrow band filter, centered at the Doppler frequency of the moving particle. However, the flow in the tube may not be constant with time and so the Doppler frequency may drift. Also laser phase noise may produce some variation of the frequency. The bandwidth of the analog narrow band filter must be sufficient to pass these frequency variations over the time scale of a complete analysis which may take hours. Therefore, the narrow band analog filter should cover the overall spectral width of long term drift. The signal which passes through this filter will be digitized directly (with difference computed after digitization), or if the signal differences are done by analog electronics, then the difference signal will be digitized as shown in
In some cases, the particle size of the detected particle may be important. A second optical system, which measures lower angle scattering, can be placed into the flow tube. This system can project a beam across the flow tube to detect and count larger particles which do not require the high sensitivity of the backscatter system shown in
This 180 degree optical phase technique can also be applied to conventional dynamic light scattering systems which measure heterodyned scattered light from multiple particles, moving due to Brownian motion. The interference of the local oscillator and the scattered light from each particle will produce a signal which consists of a group of sinusoids of random phase and frequency. Each of these sinusoids will be measured by both detectors with a 180 degree phase shift between them, so that when the two phase shifted signals are subtracted, the common mode excess laser noise cancels out leaving only the signal due to Brownian motion of the particles. This double detector system can be designed as shown in
A1−A2=mπ where m is an odd integer
If the optical path length of the fiber optic mirrored arms vary due to temperature or stress changes in the fiber optic, the phase of one arm could be controlled by an fiber optic phase modulator, and a feed back loop, to maintain the maximum heterodyne beat signal at the output of the difference circuit.
A1−A2=mπ where m is an odd integer
The heterodyne signals from the two detectors are bandpass filtered, by BPF1, to only pass the frequencies of interest and Fmod (see below). In addition, the signal from detector 3522 has adjustable gain G to balance the two signals as shown previously:
G=T2/T1
Both of the processed detector signals are subtracted by the DIFF difference circuit to produce the deltaS signal as described previously. The detection system may need to maintain the proper phase difference during periods when particles and scattered light are not present, to be ready for a particle transition. In this case, a phase modulator is placed between coupler 3512 and the scatter collection optics to modulate the optical phase of the scattered light with very small optical phase deviation. The frequency, Fmod, of this modulation is outside of the light scatter heterodyne frequencies of interest, to avoid contamination of the particle characterization signal. A feedback loop controls the phase shifter, between coupler 3512 and coupler 3514, to continually maximize the Fmod frequency component in the deltaS signal, accommodating thermal and stress induced optical phase drift in the fiber optics. The deltaS signal is filtered, by bandpass filter BPF3, to remove spurious signals and to pass only the Fmod frequency component to the feedback controller. The deltaS signal is filtered, by bandpass filter BPF2, to pass the scatter signals of interest and to remove the Fmod frequency component before being digitized for analysis by the computer. If particles are present continuously or for sufficient period to adjust the optical phase before data collection, then the feedback circuit could control by maximizing the scatter portion of the heterodyne signal, without the need for the optical phase modulator at Fmod. The same methods, as described previously using anti-reflection coatings and beam dumps, should be used to reduce the light reflection at all ends of fiber optics and surfaces of conventional optics to avoid laser feedback noise and interferometric noise.
The system in
These techniques could be applied to remove excess laser noise from any heterodyne signals.
The Zeta potential of particles can be determined from the electric mobility, of the particle, measured from the particle velocity in an electric field. However, motion of the dispersing fluid in the electric field can produce errors in the measurement of the particle motion. One way of reducing the fluid motion is to use an oscillating electric field, which rapidly oscillates positive and negative as shown in
Therefore, the spectrum of the heterodyne signal should be upshifted to be centered about some frequency which is greater than the largest negative Doppler frequency shift which is to be detected. This frequency upshift can be provided by optical phase modulation of the source light, just before the light is mixed with the scattered light, to provide a frequency shift to the entire spectrum. If the optical phase is ramped during the data collection, as shown in
The power spectrum P(f) of the detector current, from data taken during the A/D sample period, in either configuration will consist of the Doppler spectrum, S(f), from the particle motion due to the electric field force on the particles, convolved with the Doppler spectrum, B(f), due to Brownian motion and the spectral broadening, W(f), due to the finite width or shape of the velocity vs. time function.
P(f)=S(f)ΘB(f)ΘW(f)
Where Θ is the convolution operator
The goal is to determine S(f) which is indicative of the motion due to the electric field force. This can be solved for by inverting the P(f) equation using deconvolution algorithms where the impulse response for the algorithm is:
H(f)=B(f)ΘW(f)
For example, if the velocity is constant during the A/D sampling period, W(f) is the square of the SINC function (sin(x)/x) from the Fourier Transform of the RECT (rectangle) function representing the A/D sampling period. Use of this function is optional; W(f) could be eliminated from the above equations, but with additional spectral broadening in the result for S(f). B(f) is the Lorenzian function which describes the spectral broadening due to Brownian motion of the particles. So these two spectral broadening mechanisms can be removed from P(f) to produce the spectrum, S(f), due to only the particle motion caused by the electric field force on the particles, by using deconvolution algorithms such as iterative deconvolution. This deconvolution could be done multiple times over various frequency intervals for P(f), where each interval represents the region for a particular size of particles, because B(f) is particle size dependent. Therefore the various modes in the S(f) function should each be associated with a certain particle diameter, d, and a certain Brownian spectral broadening B(d,f). Each of these frequency intervals could be deconvolved individually, using the B(d,f) corresponding to the size of the particles in that interval. Otherwise, if this correspondence is not known, the entire spectrum could be deconvolved with the B(d,f) for either the average particle diameter d, or the largest particle diameter d of the particle sample. The solution, based upon the largest d, would provide the least amount of spectral sharpening and mobility resolution, but it would not produce artifacts from “over-sharpening” of the spectra, which would be caused by using B(d,f) from a diameter d which is smaller than most of the particles in the sample. The size of the particles can be determined by turning off the electric field and measuring the Brownian broadened spectra alone and using known methods to determine the size distribution from the power spectrum. This measured Brownian spectrum (with electric field off) could also be used directly for B(f) in the deconvolution of the entire spectrum P(f); or individual modes of the Brownian spectrum, B(f), could be associated with certain modes of P(f) to break P(f) up into multiple frequency ranges (one for each mode) with a separate deconvolution and separate B(f) function for each deconvolution. The measured Brownian spectrum with zero electric field is the positive frequency half of the full symmetrical Brownian spectrum, which is symmetrical about zero frequency. Therefore, B(f) is created by using the measured Brownian spectrum for positive frequencies only and using the mirror image of that spectrum for the negative frequency region, producing a full function B(f), which is symmetrical about zero frequency, from the positive frequency half spectrum provided by the measured Brownian spectrum at zero electric field.
If P(f) were measured at various peak electric field values, the Brownian spectral broadening could be determined for each mode in S(f). As the electric field increases, the frequency scale of each mode in S(f) will expand proportionally, but B(f) is independent of electric field. At very high electric fields, the modes in S(f) will be well separated, but B(f) will be the same. Therefore, a set of simultaneous equations, for P(f), can be set up to solve for the S(f) portion of P(f):
P(f,E1)=S(f,E1)ΘB(f)ΘW(f)
P(f,E2)=S(f,E2)ΘB(f)ΘW(f)
P(f,E3)=S(f,E3)ΘB(f)ΘW(f)
This set is for 3 different values of electric field, E1, E2, and E3. But any number of equations can be formed by measuring at more values of electric field E. W(f) is known from the A/D switch function and velocity function. B(f) can be determined by deconvolving all simultaneous equations with one of many different trial functions of B(f). Only the true B(f) function will produce the same frequency scaled solution S(f, E) for each of the equations, where frequency scaled solution S(f, E) is given by:
S(f,E)=S(f·E1/E,E1) for the P(f, E1) equation
S(f,E)=S(f·E2/E,E2) for the P(f, E2) equation
S(f,E)=S(f·E3/E,E3) for the P(f, E3) equation
The value of S(f) at each value of f is proportional to the scattered light of the particles with the velocity and corresponding Doppler shift equal to f. Therefore, the number or volume of particles at that velocity can be calculated by dividing S(f) by the appropriate scattering efficiency for the particles of corresponding size, which is calculated from the Brownian broadening for that particular mode in S(f). In any case, once S(f) is determined, the particle number vs. particle velocity distribution, particle number vs. mobility distribution, and particle number vs. Zeta potential distribution can all be determined directly from S(f), because the particle velocity is proportional to frequency f with known constant of proportionality; and the mobility and Zeta potential can be calculated from the velocity using known relationships. The above analysis can be applied to P(f) calculated from the data collected during each A/D sample period in
Measurement at low scattering angles is desirable for mobility measurement of particles to reduce the Doppler broadening due to Brownian motion. However, large particles scatter much more light at small angles than small particles do; and so the scatter from any debris in the sample will swamp the Doppler signal from the electric field induced motion of the smaller charged particles in the electric field and cause errors in the Zeta potential measurement.
The spectral power in certain frequency bands, as measured by fast Fourier transform of the data set or by analog electronic bandpass filters, could be used to categorize data sets. Also the ratio of scattering signals at two scattering angles would indicate the size of the particles. Consider a Zeta potential measuring dynamic scattering system (for example as shown in
The use of analog filters is only critical when the computer speed is not sufficient to calculate the power spectrum of each data set. Otherwise the power spectra could be calculated from each data set first, and then the power values in appropriate frequency bands, as determined from the computed power spectrum, could be used to sort the spectra into groups before the data is processed to produce velocity and mobility distribution. Data sets, with very high signal levels at low scattering angles and low signal levels at high scattering angles, could also indicate the presence of large particles and debris. Or a simple signal level threshold could be used to reject data sets with large signal pulses due to debris. These large particle or debris data sets, as selected by the various criteria outlined above, are not included in the final power spectrum which is used to calculate the particle velocity, mobility, and Zeta potential distributions.
The system in
Many particle size measuring systems measure the light scattered from an ensemble of particles. Unfortunately these systems cannot measure mixtures of large and small particles, because the scattering efficiency (the scattered intensity at a certain scattering angle per particle per incident intensity) of the smaller particles is much less than that of the larger particles. The contribution of scattered light from the smaller particles is lost in the more intense scattering distribution from the larger particles. These particle ensemble measuring systems also cannot resolve two closely spaced modes of a volume-vs.-size distribution or detect a tail of small particles in the presence of larger particles. This is true for both static (angular scattering) and dynamic (power spectrum or autocorrelation of the scattered light detector current) scattering distributions which must be inverted to determine the particle size distribution. This section describes methods and apparatus for centrifugal size separation and spatial separation of the particles, for subsequent spatial evaluation by either static or dynamic light scattering.
Particles in a centrifugal force field accelerate in the fluid until the viscous drag and centrifugal force is balanced. This velocity is the terminal velocity of the particle. To first order, this velocity is proportional to the product of the differential density of the particle to the surrounding liquid, the centrifugal acceleration, and the square of the particle diameter. If an ensemble of particles of various sizes is placed into a centrifugal force field, each size will reach a different terminal velocity and travel a different distance, in the direction of the centrifugal force, in a given time period. So the particles will spread out or become redistributed spatially according to size. This spatial distribution is then scanned by either a static or dynamic scattering system to accurately determine the particle size distribution. This idea could be implemented with dedicated optical scattering detection hardware or could be added as a sample cell accessory to existing particle size instruments.
The first step of the process is illustrated in
This technique will work with any starting distribution of the particles before centrifugation. Because size dependent separation will always occur, leaving smaller slower particles separated closer to their starting point, the smaller particle's size and concentration can be measured separately from the larger particles. This separation eliminates or greatly reduces the scattering cross-talk between particles of various sizes and prevents the smaller particles from getting lost in the scattering distributions of the larger particles.
The optimal starting particle concentration distribution is shown in
After centrifugation, the sample cell is removed from the centrifuge and inserted into a scattering instrument as shown in
(S1/S4−S1T/S4T)̂2+(S2/S4−S2T/S4T)̂2+(S3/S4−S3T/S4T)̂2
or
(S1/SS−S1T/SST)̂2+(S2/SS−S2T/SST)̂2+(S3/SS−S3T/SST)̂2+(S4/SS−S4T/SST)̂2
where
SS=S1+S2+S3+S4
SST=S1T+S2T+S3T+S4T
where S1, S2, S3, S4 are signals from the 4 detectors, S1T, S2T, S3T, S4T are the theoretical values of the four signals for a particular particle size, and ̂2 is the power of 2 or square of the quantity preceding the ̂.
The true size is then determined by interpolation between these two best data sets based upon interpolation in 4 dimensional space. The look up table could also be replaced by an equation in all 4 detector signals, where particle size equals a function of the 4 detector signals. This disclosure claims the use of any number of detectors to determine the particle size, with the angles and parameterization functions chosen to minimize size sensitivity to particle composition.
In any case, these scattering measurements are made at various locations along the X direction (the direction of the centrifugal force) by moving the sample cell under computer control on a motorized stage. The intensity distribution is inverted at each location to calculate the size distribution of particles at that location. This computation is started by calculating the mean particle size at a few points (X values) along the cell. This size-vs.-X data provides an effective density for the particles, using the Stokes equation for centrifuge (equation 1a or equation 1) to solve for particle density viscosity ratio using the size vs. X values. This is accomplished by doing a regression analysis on either X=V*t (using equation 1a) or X=R2 (using equation 1) vs. D to solve for (p1−p2)/q. The K value (including the effects of viscosity) in equation 2 could also be determined. Then using this effective density viscosity ratio or K value, the expected size range of particles at each X location is calculated based upon the theoretical motion of the particles in the centrifugal force field for the given period of time. The scattering distribution at each location (static or dynamic) is then inverted with a constrained inversion algorithm which limits the solution range of particle size at each location to cover a range which is similar to, but larger than, the range of sizes expected to be resident at that location, based upon equation 1a or equation 1. This prevents the particle size solutions in regions of larger particles from containing smaller particles which could not have been present at the location of the larger particles. These erroneous smaller particles might result from errors in the scattering model for high angle scattering from the larger particles. This high angle scattering tail for larger particles can change with particle refractive index and particle shape, and so it may not be known accurately. Therefore if small particles are allowed in a particle size solution for a region which should only have large particles, errors in the particle composition or high angle scattering measurements could cause the inversion algorithm to report small particles which are not real. The particle size distributions from these various locations are combined into one continuous distribution by adding them together as relative particle volume (relative among X locations) using the scattering efficiency (intensity per unit particle volume) of each particle size to calculate the particle volume at each location from the scatter intensity at that location.
The static scattering system could also be replaced by a dynamic scattering system as shown in
In
This design can provide very high numerical aperture at the sample cell, which improves signal to noise, reduces multiple scattering, and reduces Mie resonances in the scattering function. Light polarization is also preserved, maximizing the interference visibility.
The sample cell (after centrifugation) is moved by a motorized stage so that the interaction volume of the scattering system is scanned along the length (x direction) of the cell. The stage stops at various positions to accumulate a digitized time record of the detector current. The time record at each position is analyzed to determine the particle size distribution at that position. Usually either the power spectrum or autocorrelation function of the detector current vs. time record is inverted to produce the particle size distribution at each X position. This inversion may be constrained, as described above. These size distributions at various X positions are combined together to produce the complete distribution as described previously and in more detail later.
This process can be used with any starting concentration distribution. For example, if the starting distribution is homogeneous throughout the entire sample cell before centrifugation (see
The terminal velocity V in a gravitational field is given by (see parameter definitions below):
V=2g(DA2)(p1−p2)/(9q) for gravitational acceleration g (1a)
So the distance traveled by the particle in time t is simply V*t.
In order to understand the analysis of the resulting dispersion in a centrifuge, one must determine how the particles move within a centrifugal force field. A particle at radius R1 at time t=0 will move to radius R2 at time t, where R1 and R2 are radii measured from the center of rotation of the centrifuge. These parameters are determined by the modified Stokes equation (equation 1b) for particles in a centrifugal force field.
ln(R2/R1)=2(ŵ2)(p1−p2)(D̂2)t/(9q) (1b)
where
w is the rotational speed of the centrifuge in radians per second
p1 is the density of the particle
p2 is the density of the dispersant
q is the viscosity of the dispersant
t is the duration of centrifugation
D is the particle equivalent Stokes diameter (hydrodynamic diameter)
̂ is the power operator
ln is the natural logarithm operator
We may rewrite this equation in the following form:
ln(R2/R1)=K(D̂2) (2b)
where K=2(ŵ2)(p1−p2)t/(9q)
Particles at larger radii R1 will move farther due to the higher centrifugal acceleration at the larger radius. Therefore, the concentration of particles will decrease during the centrifugation process, because, for a given particle size, the particles at larger radii will travel faster. However, if the separation is accomplished by settling in a gravitational field, then the concentration is constant in the regions which still contain particles after settling. These regions would be particle size dependent because faster settling particles will reside closer to the bottom of the sample cell. Therefore, in any region where a certain size particle resides, the concentration of that particle size should be nearly constant over that region for gravitational settling.
But first consider the centrifugal case. For any infinitesimal segment of the dispersion, the concentration will follow equation 3b.
C1*ΔR1=C2*ΔR2 (3b)
where ΔR1 is the length of the segment at t=0 and R=R1
and ΔR2 is the length of the same segment at t=t and R=R2
If we let Z=ln(R), then ΔR=RΔZ and
C1*R1*ΔZ1=C2*R2*ΔZ2 (4b)
If the starting segment is between Z11 to Z12 at t=0; and the same segment fills the region between Z21 and Z22 at t=t. Then using equation 2b we obtain:
Z21−Z11=k(D̂2) (5b)
Z22−Z12=k(D̂2) (6b)
ΔZ1=Z12−Z11 (7b)
ΔZ2=Z22−Z21 (8b)
From equations 5b, 6b, 7b, and 8b we obtain:
ΔZ1=ΔZ2 (9b)
C1*R1=C2*R2 (10b)
C2=C1*EXP(−K(D̂2)) (11b)
where EXP is the exponential function.
So any small segment of the dispersion at centrifugal radius R1 will move to radius R2 under the centrifugal force and change concentration from C1 to C2. Therefore, the particle concentrations measured at various R values must be corrected for the change in concentration from the original starting distribution. For the case where all of the particles start close to R1 as shown in
The detection process consists of measuring the angular light scattering data set for static scattering, or the power spectrum (or autocorrelation function) data set for dynamic scattering, at various values of R along the sample cell after centrifugation or settling. These data sets at each value of R will be described by Fjm for the jth element of the mth data set at R=Rm.
Dataset element Fjm is the jth element of the mth dataset collected at radius Rm. The index m increases with increasing centrifugal radius or increasing settling distance (in the gravitational case). Larger or denser particles will reside at larger values of m. The dataset can consist of any data collected to determine the particle size, such as scattered flux at the jth scattering angle, dynamic scattering detector power in the jth spectral band, or dynamic scattering autocorrelation function in the jth delay (tau). Any of these data values represent the net data values after background has been subtracted. The background is measured by collecting the data with no particles in the laser path at each value of R. Each data set is corrected for the incident intensity of the scattering source. Each static scattered data set is divided by the source intensity; and each power spectrum or autocorrelation function is divided by the square of the source intensity. So all values of Fjm are normalized to the equivalent signal for unit incident intensity, for both static or dynamic light scattering.
Vik is the ith element of the kth particle volume-vs.-size distribution. Di is center diameter of the ith particle size channel of this volume-vs.-size distribution (the total particle volume in each particle diameter bin). This volume-vs.-size distribution can be converted to particle number-vs.-size or particle area-vs.-size by known techniques.
Definition: The sum of elements of vector Y, Yi from i=m to i=n is defined as:
SUM i:m:n (Yi)
Then let the function L=LX(n1,n2,n3,n4) be defined as:
S1j=SUM m:n1:n2 (Fjm)
S2j=SUM m:n3:n4 (Fjm)
L=SUM j:1:jmax ((((S2j/(SUM j:1:jmax (S2j))−((S1j/(SUM j:1:jmax(S1j)))̂2)
jmax=max value of j and mmax=maximum value of m
The purpose of function LX is to compare the current data set (or sum of the last few data sets) to a prior (or sum of a few prior data sets) to determine if the size distribution has changed significantly, prompting the next calculation of Vik. This will be described more clearly in the next section.
The first method involves starting the centrifugation or gravitational settling process with all of the particles in a narrow R region at the low R end of the cell as shown in
F=H*V
Where F is the vector of measured scatter values (angular scattering vs. angle, power spectrum vs. frequency, or autocorrelation function vs. delay). Element Fj could be the scattered flux at the jth scattering angle, the dynamic scattering detector power in the jth spectral band, or the dynamic scattering autocorrelation function in the jth delay (tau). V is the particle volume-vs.-size distribution vector, the particle volume in each size bin. H is the theoretical model matrix for the particles. Each column in H is the F response for the corresponding size of the matrix multiplying element from the V vector. This model depends upon the refractive indices of the particles and the dispersant. This matrix equation can be solved for V at each R (or X) value; or certain parameters (such as mean diameter and standard deviation) of the size distribution could be determined using the search methods described above. In either case, the volume distribution at each X value must be scaled before being combined. Usually the volume, calculated by solving F=H*V for V or by using the lookup tables, is normalized to a sum of 1.0 (i.e. 100%). This normalized volume, Vn, must be scaled before being added to the volume distributions from other R values to produce the complete volume distribution, Vi. This is accomplished by first calculating the normalized Fn:
First calculate the vector Fn=H*Vn
Taking the measured data vector Fm, which produced Vn, calculate the value P by computing either:
P=(SUM i:1:imax(Fmi/Fni)) or
P=((SUM i:1:imax(Fmi))/(SUM i:1:imax(Fni)))
Each size distribution is corrected for the scattering efficiency and theoretical centrifugal concentration change from the starting dispersion, (EXP(−K(D̂2)), to produce an absolute total particle volume measurement or at least one that is properly related to the other distributions measured at other values of R. The EXP(−K(D̂2) concentration correction is not required for the case of particle settling. The inversion at each value of Rk could be constrained to only solve for particle sizes that are expected to be in the range of R at that step, as determined from using equation 1 or 1a with the computed effective particle density viscosity ratio or K value. The solution could also be constrained to a certain size range centered on the peak of the full size distribution calculated from that data set. This peak size could also be estimated from the flux distribution with a polynomial equation of the scattering model, to save computation time. The final values of the constrained particle volume, Vik, calculated at the kth value of Rk for diameter Di, are summed together (over the various k values) to produce the final volume distribution:
Vi=SUM k:1:kmax(Pk*Vik*EXP(K(Dî2)) for centrifugal force
Vi=SUM k:1:kmax(Pk*Vik) for settling
(Note: k is an index and K is a constant, and Vi is the particle volume in the size bin whose center is at particle diameter Di)
Another easier starting distribution is simply to fill the entire cell with the particle dispersion before centrifugation or settling. The downside is that the different particle sizes are not separated into bands for each size as shown in
1) starting at the lowest R value and progressing to larger R values, measure the first flux distribution with significant signal levels Fjn1 (at Rm with m=n1) and calculate the size distribution Vi1 from Fjn1. Each size distribution is corrected for the scattering efficiency, the scattered intensity, and EXP(−K(D̂2) to produce an absolute total particle volume measurement or one that is properly related to the other distributions measured at other values of R. The EXP(−K(D̂2) concentration correction is not required for the case of particle settling. Continue stepping to larger Rm values and measuring Fim, calculating the value Ll at each Rm until Ll becomes larger than some limit Lt at Rn2. At this point the scattered data has changed sufficiently to indicate that new particle sizes are present.
Qj=((((Fjm/(SUM j:1:jmax(Fjm))−((Fjn1/(SUM j:1:jmax(Fjn1)))̂2)
L1=SUM j:1:jmax(Qj);
Invert the flux difference, Fj=Fjn2−Fjn1, to obtain the second volume distribution Vi2.
Starting at m=Rn2+1 calculate L2 at each Rm until L2 becomes greater than Lt (Fjn3 at Rn3) then invert Fjn3−Fjn2 to obtain Vi3
Qj=((((Fjm/(SUM j:1:jmax(Fjm))−((Fjn2/(SUM j:1:jmax(Fjn2)))̂2)
L2=SUM j:1:jmax(Qj);
Starting at m=Rn3+1 calculate L3 at each Rm until L3 becomes greater than Lt (Fjn4 at Rn4) then invert Fjn4−Fjn3 to obtain Vi4
Qj=((((Fjm/(SUM j:1:jmax(Fjm))−((Fjn3/(SUM j:1:jmax(Fjn3)))̂2)
L3=SUM j:1:jmax(Qj);
This cycle is continued until the end of the cell is reached at Rmmax. The volume-vs.-size distribution is calculated by summing all of the calculated Vik over k as described previously.
Vi=SUM k:1:kmax(Pk*Vik*EXP(K(Dî2)) for centrifugal
Vi=SUM k:1:kmax(Pk*Vik) for settling
This process provides two important advantages. The incremental flux is inverted at each inversion step to provide optimum accuracy and resolution. Inversions are only done when the incremental flux is significant to save computer time. However, inversions can be done at more values of R, if computer time is not an issue.
The strategies for both layer (slug) and homogeneous start are similar. The scattered signal (static or dynamic) is measured at the first radius where the signal to noise is satisfactory. The particle size distribution is calculated at this point from that data set (angular scattering distribution, or power spectrum or autocorrelation of the detector current). Then the scattering detection system scan continues to next radius where the signal characteristics have changed significantly to indicate the presence of particles of a new size. At this point the sum of all of the data sets since the last particle size calculation are added together (for example, the signal at each scattering angle is summed over the data sets from various R values) and inverted to calculate the second size distribution, in the case of the layer start. This summation is done for each scattering angle (or power spectrum frequency band or autocorrelation delay) by summing over the data sets. In the case of the homogeneous start, the difference between this latest data set and the data set at the last size distribution calculation could be inverted to calculate the second size distribution. Then the first data set is replaced by the latest data set and the cycle is repeated until the end of the cell is reached. Each size distribution calculation (inversion) can be constrained to the expected size region covered by the accumulated set of signals since the last size distribution calculation. However, complete unconstrained inversions can also be used. For the constrained inversion, the constrained size range may be based upon some region around the peak size of the data set (or accumulated data sets for layer start), or the expected hydrodynamic size over that region of centrifugal radii, using equation 1 or 1a. These constraints can be the same for both the layer and homogeneous start, because in the homogeneous start the differential signal is inverted and this signal covers the same size range as in the layer case if the two endpoints are at the same radii. Essentially, in the layer method, all of the data sets are summed by groups from certain regions where the particle size distribution does not change significantly. Each group sum is inverted to produce a size distribution. In the homogeneous method, the difference between the data sets, at the endpoints of each region of similar particle size, are inverted to produce a size distribution. Then the resulting size distributions are combined as shown before.
Computation time is saved by choosing groups of data, over which the size has changed less than a certain amount. If computation time is not a problem, the entire R range of the cell could be broken up into very small regions. The data sets in each region are summed to produce one data set which is analyzed to produce the particle size distribution in that region. Then the large number of size distributions from these regions are combined as described above in this disclosure. The most computationally intensive procedure is the inversion of the data to produce the size distribution. This procedure is usually an iterative algorithm or search algorithm to find the particle size distribution which produces a theoretical data set which has the best fit to the measured data set. So the number of regions should be minimized to save computation time. However, if the computer is very fast, the entire cell can be broken up into small segments of R and the particle size distribution can be generated for each of these small segments and then added together as described before without determining where the signal shape has changed significantly to indicate the presence of particles of a new size.
The following equations and
Sin=SUM m:n1:n2(Fim)
DIFF(n,m)=SUM i:1:maxi((Sin/(SUM i:1:imax(Sin))−Sim/(SUM i:1:imax(Sim))̂2)
When the system starts in the homogeneous case before centrifugation, the techniques are briefly listed below. These techniques assume that the first data set is collected at the minimum centrifugal radius and successive data sets are collected in sequence towards larger centrifugal radii.
1) Subtract the prior data from the present data and invert the difference to obtain the particle size distribution for that region. Then combine regions scaled by the absolute particle volume represented by each differential data set.
2) Constrain the present inversion to match the results of the inversion of data from the prior measured region in the primary size region of the prior region.
3) Invert all of the data sets from different regions, individually, and then combine them by using the size distribution in the primary size region of each data set and scaling them to each other in overlap size regions.
As you can see, the homogeneous method is the more difficult method for signal inversion because of the inaccuracies in the signal differences. However this method is the easiest to implement because you simply fill the cell with a homogeneous dispersion. In the case of the layer method, a thin layer of dispersion must be placed at the top of a cell filled with clear dispersant. A method for accomplishing this is shown in
A cassette for dispensing a layer of dispersion at the top of the cell is built into the cell cap. The cassette consists of a mesh, for holding the dispersion, which is sandwiched between a plunger and a support screen. The surface tension of the dispersion and the mesh/screen retain a thin layer of dispersion after it is extracted by a spring loaded plunger. This cassette is loaded by a process shown in
This process could also be accomplished with a cell cap which has only the mesh and/or screen, without the plunger and spring. If the thin mesh and/or screen is immersed into the particle dispersion and agitated, the dispersion will fill the mesh and/or screen and be held by surface tension for transfer to the cell. Then when the cap is placed onto a cell with clean dispersant, the clean dispersant will wet the air/particle dispersion interface of the cap, reducing the surface tension forces. During the centrifugation process, the particles will be pulled out of the mesh and/or screen into the clear dispersant by the centrifugal force.
In both the layer and homogeneous start cases, the duration and centrifugal acceleration (determined from centrifuge rotation speed) of the centrifugation must be controlled so that the particle sizes of interest remain in suspension and that sufficient separation of the sizes occurs. If the duration is too short, you will have poor separation. If the duration is too long, some of the larger particles may all be impacted on the bottom surface of cell (or the large R end of the cell), where they cannot be detected by the scattering system. The duration could be optimized by scanning the cell after a short duration to determine the distance which the largest particles have moved. Then the computer could calculate the additional duration and rotation speed required to spread the particles, in the size region of interest, across the cell for maximum separation and size resolution.
Another advantage of this method is the reduced sensitivity to particle composition. In other ensemble particle size methods, such as dynamic and static light scattering, the major need for an accurate scattering model (particle and dispersant refractive indices, and particle sphericity) is to account for light scattering from particles of one size interfering with light scattered by particles of another size. This usually causes the incorrect presence or absence of addition modes or tails in the particle size distribution. However, since the particles are spatially separated by size before scanning, there is very little scattering crosstalk between different sizes. This is true for both the layer and homogeneous start cases because both of them separate the scattered signals to be representative of certain size bands. The layer start case does it directly and the homogeneous start case uses subtraction of a prior signal to create a differential signal input from a cumulative spatial distribution. In fact, if the spatial separation is clean, the scattering model can be determined from the scattering data sets collected over the cell scan by either using equation 1 or equation 1a to determine the hydrodynamic size, or by using the maximum calculated optical size (from scattered light measurements) for that region.
For very broad particle size distributions, the largest particles may reach the end of the centrifuge cell before the smallest particles have moved a sufficient distance to provide good size separation. In this case the total size distribution may be created from a group of scans of the centrifuge cell at various centrifugation periods. To accomplish this, the first scan will determine the largest particle size in the sample. Then the computer will determine the added centrifugation period required to drive the largest particles to the end of the cell. After this period, the cell is scanned again to produce the first particle size distribution. The next centrifugation period is calculated to drive the smallest well detected size, of this latest scan, to the end of the cell. This sequence of scanning the cell, size measurement, and calculating the period for the next centrifugation cycle is repeated until the smallest particles have moved sufficiently to be clearly resolved in size. Since the sample cell must be removed from the centrifuge and placed into the scanning scattering system during each cycle, this process can be labor intensive.
Once the effective particle density viscosity ratio or K value is determined from the first particle size scan or from the known value for the material, the hydrodynamic diameter which corresponds to each value of X could be determined from Stokes equations (equation 1a or 1). Then the particle size distribution could be determined by measuring the particle concentration vs. X. The particle concentration can be determined from the scattering extinction or total scattered light at each X position over a limited size range. This process will produce a particle size distribution based upon hydrodynamic diameter of the particles, while the scattering techniques, described above, produce an optical size. Below approximately 5 micron particle diameter, the scattering cross-section becomes particle size dependent and the particle volume must be corrected for changing scattering cross-section.
In the cases shown above, the direction of centrifugal force should be parallel to the gravitational force to avoid settling of the particles on to the cell window. However this is usually not required in the centrifuge because the centrifugal acceleration is usually over 1000 times the gravitational acceleration and the length to thickness ratio of the cell might be only 20:1. In this case, only a small fraction of the largest particles will settle and contact the window. But if this settled fraction becomes significant, then the direction of centrifugal force should be made parallel to the plane of the gravitational force vector to eliminate this problem.
In the case of particle separation by gravitational settling, the cell could be scanned by the scattering system during the settling process. If the sample were settled outside of the scattering instrument, mixing of the separated particles could occur during insertion of the cell into the scattering instrument. By starting the particle settling in the scattering instrument, the cell never has to be moved during the entire process and the cell scan can be performed at various times during the settling process to improve size resolution.
The angular scattering measurements may contain speckle noise if a laser source is used. The speckle noise will cause errors in the scattered light measured by each detector. If the particles move a small amount during the signal collection, the speckle noise will average out and the errors will be reduced. This averaging process can also be accomplished by averaging the scattered signals from groups of angular scattering signal captures which are individually taken from slightly different X positions. In other words, each scattering data set, used in the analysis, is the average of many angular signal set captures, each one from a slightly different X (or R) value. The distance of each step (perhaps a few microns) between each of these signal captures is much less than the step (greater than 50 microns) between each analyzed data set. So the X (or R) value for each data set would be the average X (or R) value over the group of captures for that data set. This process will reduce the amount of speckle noise in the scattering pattern and improve the accuracy of the measured scattering signals. An ultrasonic probe could also be placed into the dispersion during data collection to induce small amounts of particle motion during a single data collection (signal integration) period to average out the speckle, however this may distort the layered structure of the particle dispersion.
The homogeneous particle sample could also be placed into the scattering instrument before centrifugation to determine the approximate particle size distribution by angular scattering from the particle ensemble. With knowledge of the dispersant viscosity and density, and the particle density, the proper centrifuge settings of centrifugal acceleration (rotation speed) and centrifugation duration are calculated by a computer algorithm using equation 1 above to insure that the largest particles just reach the large R value end of the sample cell by the end of the centrifugation. In this way the maximum size separation and particle size distribution accuracy is obtained. If the user requests analysis of a certain size range, the computer can use equation 1 to determine the centrifuge settings which will spread the particles in that range across the full length of the cell. Of course, a reasonable estimate of the particle density is needed to compute these settings. This pre-centrifugation/settling measurement of a homogeneous sample could be used to calculate the above parameters for both the homogeneous and layer start cases.
For large dense particles, the settling or centrifugal induced terminal velocities may be too large to obtain a controlled spread across the sample cell. Also, particles may settle to the bottom of the cell while the cell is being inserted into the scattering instrument. In this case, dispersants with higher viscosity could be used to allow spatial/size separation of large dense particles in the centrifuge. Then after centrifugation, the particles are held in place by the high viscosity. For example, glycerin could be added to water dispersant to adjust the viscosity to reduce the terminal velocities of the largest particles so that centrifugation can easily distribute the particles across the cell and that distribution is held in place during transfer of the cell to the scattering instrument.
The scattering efficiency problems described at the beginning of this disclosure are worst for particles of diameter below approximately 5 microns. Therefore, these techniques are usually applied below a few microns where the scattering angles are larger and angular alignment tolerances are relaxed. Under these relaxed alignment conditions, the sample cell, filled with clear dispersant, could be inserted into a holder, in the instrument, which registers the cell into a corner under spring load. The source beam is then aligned to the appropriate point on the detector array. The cell is then scanned to obtain the scattering background at various R values along the cell. A known small amount of concentrated particle dispersion is injected into the cell. This cell is agitated to provide a homogenous concentration and then the cell inserted back into the holder. The instrument collects one set of scattering data. Based upon the scattered signal intensities, the instrument calculates the amount of additional concentrated particle dispersion which should be added to the cell to provide optimal scattering signal levels, as illustrated in
The tip of the fiber in the dispersion could be bent at various angles to provide the least disturbance to the dispersion or it could be bent at right angle to avoid Doppler shifts from settling particles by bending the tip so that the optical axis of the fiber is perpendicular to the settling direction. But normally settling will not be a problem, if centrifugation is required to obtain particle motion. Most angles will work well, but a straight fiber probe would provide the least disturbance to the dispersion so that multiple scans can be made in different portions of the cell without affecting each other.
The disturbance to the particle concentration distribution can be avoided completely by using a scanning system which does not contact the dispersion as shown before in
Some advantages of these methods are listed below:
1) Samples with very low density differences between the dispersant and the particle are difficult to measure due to the high sensitivity of size to small errors in density. The methods described above can provide accurate size measurements even for samples with low density differences between the dispersant and the particle, because the size can be measured from optical scattering.
2) When the density difference between the dispersant and the particle is small, particle diffusion can become significant as compared to the terminal velocity. The methods described above will provide accurate size distribution for these cases.
3) The size accuracy is not sensitive to particle composition because the effects of large angle scattering tails, from larger particles, on the scattering of smaller particles is reduced by the spatial separation of particles based upon size.
4) The best information can be used to determine the particle size distribution. If the spatial distribution of the particles provides better particle size accuracy (using scattering measurements to determine the particle concentration distribution vs. R and equations 1 or 1a to determine the hydrodynamic size at each value of R), then it will be used instead of the size distribution calculated from the static or dynamic scattering distribution alone.
5) The scattering efficiency function could be produced empirically from the spatially separated modes of samples with known mixture ratios because each mode is measured individually in the same sample. There would be no need for absolute scattering measurements of individual samples.
6) Knowledge of the dispersant viscosity and density, and particle density, are not required to obtain accurate particle size distribution measurement when using the scattering distribution to determine size at each value of R.
High resolution particle size measurement has not been demonstrated for particle ensembles. High size resolution can only be obtained through sample dilution and individual particle counting. However, the count accuracy of particle counters is limited by Poisson statistics of the counting process. This is particularly problematic for broad distributions commonly seen in industrial processes. The following describes a methodology for measuring particle size distributions of particle ensembles, with high size resolution and volumetric accuracy. This is accomplished by measuring the terminal velocities of particles in a centrifugal force field, produced in a rotating centrifuge.
The entire sample, container, and optical system are contained in an arm of a rotating centrifuge. Near to the center of rotation is a battery and electronics for powering the detector and light sources. The high pass filtered signal is transferred from the rotating system to the A/D converter of a stationary computer through an optical rotary connection consisting of an optical source, such as an LED, which rotates with the centrifuge and a stationary optical detector. The LED intensity is modulated by the high pass filtered signal and read by the stationary detector to transfer the signal to the A/D. This rotary connection could also be accomplished by radio transmitters, digital storage devices and electronic rotary connectors, some of which use mercury for conduction of the signal. The use of the high pass filter is critical to maintain signal integrity through this rotary connection. The enormous zero frequency component of the heterodyne signal could produce spurious signals in the rotary connection, in the spectral region of interest.
If the A/D converter were placed in the rotating electronics, then digital light (or electrical) signals could be transmitted through the rotary connection (or by other means mentioned previously). This system would be relatively immune to noise in this connection and would provide easy access to scattering signals from multiple detectors by time multiplexing. The advantages of measuring scattering signals at various scattering angles are discussed later in this disclosure.
The velocity of the particles being pulled by the centrifugal force depends upon particle size and density. Larger or denser particles will attain larger velocities and produce higher heterodyne beat frequencies. The local velocity over a small region about centrifugal radius R is given by Vo below:
ln(R2/R1)=2(ŵ2)(p1−p2)(D̂2)t/(9q) (from previous description) (1)
Vo=k1*R
Where k1=2(ŵ2)(p1−p2)(D̂2)/(9q)
Any particle of a certain size and density will produce a narrow heterodyne spectrum, which can easily be separated from the narrow spectra of other particles of nearly the same size and density, resulting in high size (and density) resolution and accuracy. The spectrum of a particle ensemble, with a multimodal size distribution, will consist of a group of line spectra which only need correction for scattering efficiency to produce accurate particle size distribution. Other spectral broadening mechanisms must also be considered.
The distance (or scattering pathlength) between the windows may be shortened to lower multiple scattering when measuring high concentration particle dispersions. Also the optical system could be folded to create a compact system which could be inserted into a commercial laboratory centrifuge. Also the beamsplitter could be replaced by a fiber optic coupler. Other configurations of heterodyne systems for measuring particle velocity are also possible and are claimed for use in this invention.
Usually centrifuges have long speed ramp up and slow down periods. Also different centrifuge speeds may be used to cover different particle size ranges. Therefore, the heterodyne spectrum should be corrected for the actual centrifugal force by monitoring the rotational velocity of the centrifuge and shifting the relationship between size and heterodyne spectral frequency accordingly.
Another aspect of this invention is the method of introducing the particle dispersion into the sample container. For low concentration samples, a scattering background signal should be measured with clear dispersant and then the particle dispersion should be measured separately; and these two spectra are then subtracted from each other to eliminate the effect of system background scatter and noise. This is easily accomplished by employing a compression seal at the inlet and a low pressure relief valve at the outlet of the container. The compression seal could match the tapered end of a syringe body and plunger (without syringe needle) so the sample or dispersant could be forced into the container under pressure, forcing the prior sample out through the relief valve. Then a user could repeatedly introduce various particle samples (or dispersants for background) without turning any valves between each sample change. The syringe body tip is pressed into the inlet seal and the plunger is then used to force the prior sample out through the relief valve. The contents of the sample container can also be blown out by using an empty syringe (or compressed gas) to force air or gas through the container. A bypass valve is also used for flushing the sample container.
Larger or denser particles will have high velocities, due to the centrifugal force, and these particles will all move through the sensing region too quickly to obtain a spectrum. In these cases, the sample cell and optical system can be oriented to allow gravity to provide a much lower force on the particles, with the gravitational force nearly along the same direction as the centrifugal force, as indicated in
The sample could also be placed between two flat transparent windows, which could be disc shaped. The outer edges of these discs are sealed to provide a thin disc shaped sample cell. The particle dispersion is then injected to fill the cavity between the disc windows. The disc sample cell is spun about its axis of symmetry perpendicular to the disc plane. The particles will accelerate along the tangential direction of rotation and reach nearly the same rotational speed of the discs. The centrifugal force will pull the particles out radially. An optical system, as shown in
Theoretically, the tangential velocity component of the particles would be perpendicular to the scattering plane and hence it would produce zero Doppler frequency shift in the scattered light spectrum. However, a beam of finite size would view some particles with velocities which are not perpendicular to the scattering plane and would produce a scattering spectrum which interfered with that due to the radial centrifugal component. Therefore the scattering plane could be adjusted to not be parallel to the radial direction. The angle between the scattering plane and radial direction would be adjusted so that the narrow Doppler shifted spectrum, due to the tangential velocity component, would be shifted to frequencies well above that of the radial velocity distribution to avoid interference between the two spectra. The anti-aliasing filter must remove frequencies from this tangential velocity spectrum, which alias into the spectrum from the radial velocity component. Likewise, the tangential velocity of dust and other scatterers on the disc surfaces will also produce spectra, which are shifted to higher frequencies and further removed by background subtraction (by measuring the spectra without particles present in the cell).
Another advantage of these ideas is the ability to electronically change the particle size range and size resolution by adjusting the ADC sampling rate and anti-aliasing filter. Once the particles reach terminal radial velocity due to the centrifugal force, a broadband spectra could be measured to determine the frequency region of the Doppler spectrum. Then the sampling rate would be adjusted to optimize resolution in that frequency region. The user could also adjust the sampling rate to look at fine details of the particle size distribution in certain size ranges. After entering a size range of interest, the computer would calculate the proper sampling rate and anti-aliasing filter parameters to optimize size resolution.
The power spectrum of the optical detector current contains a constant local oscillator and a frequency dependent component. The frequency dependent component is described by the following equations:
P(f)=(S(d,a,nm,np)̂2)*(E*Ĝ2)/(4pî2*(f−G*v)̂2+(EĜ2)̂2)
where
P=power spectrum of the detector current
S=scattering efficiency per unit particle volume
d=particle diameter
pp=particle density
pm=dispersant density
eta=dispersant viscosity
f=frequency
np=refractive index of particle
nm=refractive index of dispersant
a=scattering angle
v=terminal particle velocity
c=constant which depends on dispersant viscosity and particle shape
for spherical particles c=2/(9*eta)
̂2=square of quantity
g=acceleration due to centrifugation or gravitational settling
k=Boltzman's constant
T=dispersant temperature
w1=wavelength of the source light
This equation can be reduced to the form:
P(f)=c*((sin(a/2)/w1)̂2)*(S((d,a,nm,np)̂2)/((f−fs)̂2+fb̂2)
where
fs=B*d̂2*sin(a/2)*g*(pp−pm)/w1 Doppler frequency shift due to terminal velocity
B=2 nm*c
fb=c*(sin(a/2)/w1)̂2/d spectral broadening due to Brownian motion
The light scattering intensity S(d,a,nm,np) per unit particle volume and per unit incident light irradiance depends upon the scattering angle (a), particle diameter (d) and refractive indices of the particle (np) and dispersant (nm). This scattering efficiency is small for small particles and grows with increasing particle diameter up until approximately 1 micron. Above 1 micron, the scattering efficiency oscillates versus particle diameter. This behavior depends upon the scattering angle and refractive indices, but the behavior is similar for most types of spherical particles. The oscillations are caused by optical interference between the light diffracted by the particle and transmitted by the particle. For non-spherical particles these oscillations are dampened by the random orientation of the scatters. So in general, the amplitude of these oscillations may be difficult to predict. The best strategy is to choose optimal scattering angles where oscillations are small but will still give sufficient Doppler shift to avoid low frequency noise in the detector electronics, through filtering.
The larger scattering angles provide larger Doppler frequency shifts for a given particle velocity. Hence, larger scattering angles are needed for smaller particles which have lower velocities in the centrifugal force field. Also, small particles produce less scattered light per unit particle volume. Therefore the optical detector must subtend a larger angular width to generate sufficient signal level. The Doppler shift is proportional to the sine of half of the scattering angle. The angular subtense of the detector must be small for two reasons: to include only a few coherence areas on the detector and to reduce the spectral spread due to the variation of Doppler frequency with scattering angle.
As shown above, the Doppler shift is proportional to sin(a/2). For small, low density particles such as 0.1 micron polystyrene spheres, centrifugal accelerations of 100,000 G's will produce 10 Hertz Doppler frequency at 10 degrees scattering angle. And this frequency increases proportional to the square of the particle diameter. At a 10 degree scattering angle, the scattering efficiency is a well behaved function of particle diameter below 1 micron particle diameter. Above 1 micron, the degree scattering efficiency shows many large oscillations as a function of particle diameter, while the scattering efficiency at 1 degree is smooth and well behaved. The Doppler shift for 0.1 and 1 micron particles are 1 Hertz and 100 Hertz, respectively at 1 degree, and 10 and 1000 Hertz, respectively at 10 degrees. Therefore, to cover an extended size range, the scattered light must be measured at multiple angles to provide sufficient Doppler shift for small particles (using large angles) and to avoid scattering resonances for larger particles (using small angles). Larger angles are also needed at lower acceleration levels, to maintain sufficient Doppler shifts. By measuring multiple scattering angles, the size regions where scattering efficiency oscillations occur may be avoided by solving the problem in regions of well behaved scattering efficiency.
This invention will greatly improve both the accuracy and resolution of particle size measurement over a large particle size range, because each particle will create a narrow detector current power spectral line whose position is size dependent. The spectrum consists of a symmetrical Lorenzian Brownian broadened spectrum which is shifted by the Doppler frequency of the terminal velocity. As the scattering angle decreases, the Brownian spectral width decreases relative to the Doppler shift and the size resolution increases. Smaller particles have a broader Brownian spectrum and smaller Doppler shift. The scattering angle should be large enough to push the Doppler spectrum above the low frequency noise of the system, but very large angles will degrade size resolution, because the Brownian spectral width will become comparable to the Doppler shift. In general this tradeoff cannot reduce the spectral line broadening to negligible levels. And so this broadening must be accounted for in the theoretical model. This Brownian broadening could be reduced by using the same deconvolution techniques as described previously for measurements of Zeta potential. However the effects of broadening can also be resolved by measuring the power spectra (or autocorrelation functions) of the optical scattering light detector at various scattering angles and various accelerations. The particle volume distribution (the particle volume per unit particle diameter interval) can be determined from these multiple spectra, by solving a single set of linear equations as shown in the matrix equation shown in Table 1.
V(d) is the volume distribution versus the particle diameter (d). Each power spectrum is the addition of all the power spectra from each particle in the scattering volume, which is the intersection of the particle sample and the incident light beam. Table 1 shows one example, where the power spectral density is measured at various frequencies (f1,f2, . . . fn), scattering angles (a1,a2) and acceleration levels (g1,g2). These spectra create a set of linear equations, which are usually overdetermined and solved by least square or other iterative techniques to obtain the volume distribution V(d). The most straight forward method is to simply invert the matrix equation in Table 1. The equation for P(f) given above is used to calculate the elements of the matrix in Table 1. All of the examples given so far are only for illustration, this invention assumes that any number of accelerations, scattering angles, and detection frequencies may be needed to optimize the condition of this system of equations. Also power spectra may be replaced by their inverse Fourier Transform (the autocorrelation function of the scattered detector) to form a similar set of equations in time instead of frequency space. However, the best performance will be seen by using the power spectrum, because the spectrum of each particle is clearly separated in frequency space.
Also these different spectra may be solved as separate linear systems if this is advantageous. Notice that the Doppler frequency shift (fs) is proportional to the difference (pp−pm) between the particle and dispersant densities and the acceleration (g). However the Brownian width does not depend on the density difference. Therefore, this density difference can be determined by solving for the density difference as a parameter in the equation set, by using non-linear techniques.
Techniques for reducing the effects of spectral broadening due to Brownian motion are the same for Zeta potential and centrifugal systems. In both cases, the particle velocity distribution due to the preferred force (electric field for Zeta potential and centrifugal or gravitational force for particle size) is broadened by Brownian motion. Therefore any broadening reduction method, used in one measurement type, can also be used in the other. For example, the matrix equation in Table 1 could be used with Zeta potential by replacing the theoretical model for centrifugation with the model for electric mobility. Then the accelerations (g1, g2, etc.) would be replaced by various electric field levels and the form of equations in Table 1 could be used to improve resolution in Zeta potential measurements.
The following describes various optical configurations for measuring the spectral characteristics of scattered light at multiple angles.
All optical configurations in this disclosure assume the following:
The designs can be extended to any number of scattering angles. The sample cell or sample container may refer to either the disc shaped cell (which rotates without optics or electronics) or the small cell (which rotates with the optics and electronics).
This configuration uses fiber optics to carry light to and from the particle sample (see
The second fiber optic configuration is similar to the first, except that the source light is split off from the source fiber, by fiber coupler 5404, and mixed directly with the scattered light using fiber optic couplers 5401 and 5402, as shown in
This configuration uses beamsplitters to provide the local oscillator (see
In this configuration, the local oscillator is provided through the scattering volume, as shown in
The Doppler frequency shift changes with scattering angle. Therefore, collection of scattering over wide range of scattering angles will create significant broadening of the shifted spectrum, requiring deconvolution to retrieve size resolution. However, collection over a narrow angular range will maximize the errors caused by Mie resonances. By measuring over a wide range of scattering angles, the Mie resonances are washed out. This is accomplished by measuring the scattered light from particles flowing through a modulated light pattern, such as a group of interference fringes. As the particles flow through the fringe pattern, the scattered light from each particle is modulated with a frequency indicative of particle velocity and size. The spectral width of the scattered light is not broadened significantly by collecting scattered light over a wide range of angles in this fringe field, which may be produced through interference between two light beams as shown in
A coherent light source, such as a laser diode, is focused or collimated into the sample container by lens 5701. A beamsplitter produces a second beam 5712 which creates interference fringes with beam 5711 in the sample container. Light scattered by particles in the fringe region is collected by lens 5702, which focuses this light onto a detector. The signal from the detector may (or may not) be electronically filtered before being transmitted to the stationary A/D. In this case, a radio transmitter is used in the rotating system to transmit the scattering signal to a stationary radio receiver at the input to the A/D. Commercially available wireless FM, Blue Tooth, or wireless digital microphone technology could be used to transmit the digital or analog data from the rotating centrifuge to the stationary computer. These devices have sufficient signal to noise and bandwidth. The detector signal could also be stored in digital storage (memory chip) in the rotating system and then read out by connection to the computer after the centrifuge has stopped. The optical rotational coupling, radio transmitter, and digital storage are three means of transferring the scattered light signal from the rotating system to the stationary computer. All three of these techniques are claimed for all configurations associated with this disclosure.
Since the target image has limited depth of focus in the sample container, some particles will pass through regions where the fringes are out of focus. This will cause broadening of the modulation spectrum and the impulse response of the linear system which describes the scattered signals. By reducing the pathlength through the sample container, the particles may be restricted to the region of best focus for the target. Alternatively, the resulting scattering signal spectrum may be deconvolved by including the spectral broadening in the scattering model and inverting that model by use of iterative optimization techniques or deconvolution.
Even with wide angular collection, Mie resonances may still be a problem for narrow wavelength bandwidth sources. Another problem is size dynamic range. A single fringe spatial frequency can only handle particles with diameters smaller than the inter-fringe spacing, but with sufficient size (and velocity) to cause high modulation frequency. A particle, which is much smaller than the fringe inter-fringe spacing, may travel too slowly to produce a scatter signal modulation frequency above the 1/f noise of the detection system. Fringe patterns with smaller inter-fringe spacing are needed for small, low velocity particles. The best solution is multiple fringe spacings. By using multiple beamsplitters and detectors, multiple fringe fields may be created with different inter-fringe spacings. Each fringe field is imaged onto a separate detector to separate the modulated scatter signals for each fringe field.
Since this multiple beam splitter concept may be expensive to manufacture, a better alternative is to image a sinusoidal absorption (or reflection) grating, with various fringe spacings, into the particle dispersion. As each particle passes through the grating image, the scattered light from that particle is modulated by the periodic intensity profile of the image. A standard optical absorption resolution target could be used to produce an image with multiple regions, each region with a different sinusoidal wavelength as shown in
In
Each of these detector signals can be transmitted separately to the computer through multiple transmission channels. Also the signals could be sent sequentially because the spectral properties of each detector signal are stationary over short periods of time. The signal properties only change when the largest particle fraction passes through the interaction region. So a short signal segment can be sent from each detector sequentially on a single transmission channel. Also a fast A/D could do sequential multi-channel sampling where each successive sample point is from the next detector. This A/D signal is then transmitted to the computer receiver and disassembled and recombined into separate detector data streams in the computer.
For very small particles, which need short inter-fringe spacing, either the crossed laser beam (
As mentioned before, Mie resonances may present a problem for ensemble scattering measurements because the scattering amplitude will be a multi-valued function of particle size. However in the size region between 2 and 10 microns where these resonances occur, the particle concentration could be lowered to insure that only a few particles are in the beam at any time. Low numbers of particles will produce a discrete set of line spectra in the power spectrum instead of a broad continuum, one line for each particle. These line spectra can be separated for individual counting and sizing of particles based upon their Doppler frequency. Then the variation of the amplitude of each spectral line due to Mie resonances or scattering efficiency variations will not effect the size determination. In most applications, the particle volume vs. size distribution is relative uniform and the particle count vs. size distribution is proportional to the volume distribution divided by the particle diameter cubed. So larger particles will have much lower particle number concentrations and the line spectra/counting method could be employed without coincidence problems in the line spectra. This method can count and size individual particles, with many particles in the beam at one time, provided that no two particles have the same size. Even if two particles did have the same size, the amplitude of that spectral line would be double the expected amplitude and that line could be counted as two particles. This technique is very powerful in that it allows counting and sizing of individual particles in the beam even when large numbers of particles are in the beam at one time. This method is described in more detail in another filed application, “Methods and Apparatus for Determining the Size and Shape of Particles”, filed by this inventor.
Also many of the heterodyne and fringe systems, described in “Methods and Apparatus for Determining the Size and Shape of Particles”, can be placed into a centrifuge to produce the same data as described in this document.
The particle velocity detection systems in
The fiber optic system and electronics would be mounted into the center portion of the rotor to minimize the centrifugal force on the fiber components. And the scatter signals would be transmitted to the stationary computer by any of the methods described above, including optical coupling and radio transmission.
The scattering efficiency for large particles is much higher and less multi-valued at lower scattering angles. Therefore, to detect the larger particles in settling and centrifugal mode, or Brownian motion mode, additional detectors are required to measure scattered light at lower scattering angles as shown in
Many of the scattering detection systems, described in the application “Methods and Apparatus for Determining the Size and Shape of Particles” by this inventor, can also be employed as the detection means in the systems described in this document.
Many figures in this document contain optical rays which are drawn only to define object planes, image planes, and focal planes. The numerical apertures, beam diameters, and lens diameters are not necessarily drawn to scale.
In some cases, very large particles can contribute scatter signals which will distort the signals from smaller particles. Particle settling could be used to remove larger particles from the interaction volume, as shown in
Since the larger particles will have higher settling velocities, they will settle out of the interaction volume first in the scattering chamber. Hence the particle size distribution in the interaction volume will change with time. After a long period of time, only the smaller particles will remain. In the case where the settling velocity of unwanted particles is low, the interaction volume could be reduced to shorten the time required for unwanted particles to settle out of that volume. When this concept is used to measure different size ranges of the distribution, separately in time, the interaction volume could also be reduced for particles with low settling velocities. Any particle size sensor system (for example systems in
The chamber in
The homogeneous start method may be applied to the particle settling method, described above and exemplified in
This method can also be used when centrifugal force is used to move the particles through the interaction volume and the small R end of the sample cell defines a limit to the dispersion (acting like the horizontal surface in the settling case). In this case, particles of different sizes, will be depleted from the interaction volume at different times, just as in the settling case. One requirement is that the thickness of particle dispersion between the small radius end of the sample cell and the interaction volume must be short to allow the particles to move through and out of the interaction volume without being replaced by particles of the same size, in a reasonable time. The particles moving out of the interaction volume provides the same information as that obtained by scanning a sample cell after centrifugation. For a homogeneous sample, the methods described for the homogeneous start, may be applied to the sequential measurements of dynamic or static scattering (scattered light or attenuation) measured in a this configuration. The only difference is that the data corresponding to various R values, in the scanning methods described previously, will be measured at different times by the stationary detector system in the sequential case. The data set which is equivalent to the small R data in the scanning method will be the last data set measured in the set of sequential measurements of the stationary detector. The interaction volume can be the interaction volume of either a dynamic scattering system or static angular scattering system, using the analysis methods described previously, to analyze the sequential data sets collected as the particles settle out of the interaction volume. These analysis methods are described in the previously filed application.
In general, the analysis methods described previously for the layer start (
The distance of the interaction volume from the end of the sample cell, the air/liquid interface at the top of the sample cell, or the horizontal surface is determined by the terminal velocities of the particles. Large or dense particles may require a longer distance to insure that no particle size is depleted from the interaction volume before the detector is activated. This method can be used in settling or centrifugal modes. In the case of settling, the scatter detection system views a stationary interaction volume in a stationary sample cell containing the particle dispersion. For smaller particles, the higher acceleration of a centrifuge may be required to provide higher particle velocities, shorter measurement time, and less error due to particle diffusion. In the centrifuge case, the scatter detection system views a stationary point in space through which the sample cell and particle dispersion pass during each rotation of the centrifuge. The centrifuge rotor is slotted to allow optical access to the windows of the centrifuge cell.
Any of the optical systems described in this application, can be used:
(1) to scan a sample cell after removal from the centrifuge, measuring the scattered signals at various locations in the sample cell, or
(2) to scan a sample cell in a centrifuge after the centrifuge has stopped by providing optical access through the sample cell in the centrifuge, measuring the scattered signals at various locations in the sample cell, or
(3) to scan the sample cell, in the centrifuge, during rotation of the centrifuge by providing optical access through the sample cell in the centrifuge, measuring the scattered signals at various locations in the sample cell and/or various times during the centrifugation, or
(4) to view a single point in the sample cell during rotation of the centrifuge by providing optical access through the sample cell in the centrifuge, measuring the scattered signals at various times during the centrifugation. (sequential case), or (5) any of cases (1), (2), (3), or (4) where the particle motion is provided by gravitational acceleration
In each of these apparatus cases, the scatter data can be analyzed using the methods described previously for the appropriate starting case, homogeneous or layer start. For the scanning cases, the data is collected at various values of R with an optical system, which scans the sample cell along the direction of particle motion, by moving the cell or the optical system. For the sequential case, the data is collected at various times with an optical system, which is stationary relative to the particle motion direction during the settling or centrifugation process. The data analysis for the sequential case is the same as the analysis for scanning case, by replacing scatter data measured at various distances, R, with scatter data measured at different times. The methods for choosing which data sets to analyze (which locations in the scanning case and which times in the sequential case) use the same criteria for selection as described for the appropriate case, homogeneous start or layer start. These analysis methods and data set choosing methods are described in the previously filed application.
| Number | Date | Country | Kind |
|---|---|---|---|
| PCT/US2005/012173 | Apr 2005 | US | national |
This is a continuation-in-part of U.S. patent application Ser. No. 10/599,737, filed Oct. 6, 2006, which is the national phase of PCT/US05/12173, which claims priority of U.S. Provisional Patent Application No. 60/561,164, filed Apr. 10, 2004 and U.S. Provisional Patent Application No. 60/561,165, filed Apr. 10, 2004.
| Number | Date | Country | |
|---|---|---|---|
| 60561165 | Apr 2004 | US | |
| 60561164 | Apr 2004 | US |
| Number | Date | Country | |
|---|---|---|---|
| Parent | 10599737 | Oct 2006 | US |
| Child | 11930588 | US |
