The present invention relates generally to techniques for producing electron beams for transmission electron microscopy devices. More specifically, it relates to improved methods for using resonant RF cavities to produce electron beams having very high energy stability.
State-of-the-art Transmission Electron Microscopy (TEM) is based on high-brightness electron beams with beam energies typically in the range 100-300 keV. The beam energy is provided by a high-voltage (100-300 kV) electrostatic accelerator. The use of such high-voltage power supplies is cumbersome and expensive, in particular because of the requirement of an energy spread less than 1 eV, i.e. a relative energy stability of the order of 1 ppm. For applications such as Electron Energy Loss Spectroscopy (EELS) much smaller energy spreads are desired (0.01 eV or less), which at present can only be realized by using expensive energy filters and simultaneously sacrificing a substantial part of the beam current.
An attractive alternative to high-voltage electrostatic acceleration in terms of complexity and costs is acceleration by means of time-dependent fields in resonant radiofrequency (RF) cavities, as is common in relativistic particle accelerators. However, due to the limited power stability of high-power RF amplifiers, RF acceleration can provide relative energy stabilities of 10−4 at best.
It is known to use a combination of bunching cavities and accelerating cavities to generate electron beams in pulsed mode with low energy dispersion. These bunching techniques are designed to increase the efficiency of a microwave accelerator in the sense that (1) a larger part of the electrons produced by a thermionic gun is injected in the accelerating section at the proper phase for acceleration by bunching the electron beam prior to acceleration; (2) which is accomplished with a single microwave generator, which simultaneously feeds both the bunching cavities and the accelerating cavities by having them separated by common walls with carefully designed holes.
In embodiments of the present invention, on the other hand, (1) the order of bunching cavities and accelerating cavities is opposite: first the electron pulses are accelerated in accelerating cavities and subsequently they are sent through cavities that correct for energy spread. The second set of cavities is operated at 90 degrees phase difference but they do not act as bunching cavities: they are operated at such power that they stop the pulses from expanding any further; this is less power than would be required for bunching. To achieve this (2) the energy correction ‘bunching’ cavities are separated from the accelerating cavities by a drift space; if the cavities were sharing a thin common wall, as in prior art techniques, the energy correction method of the present invention would not work.
Moreover, the smallest energy spread that can be achieved with prior techniques is limited by the stability of the microwave generator. For this reason these prior methods would not be suitable for high-resolution transmission electron microscopy.
Embodiments of the present invention and prior approaches differ in several significant respects:
In one aspect, the present invention provides a method of generating an electron beam in a transmission electron microscopy device. The method includes: generating an electron pulse by a pulsed electron source, accelerating the electron pulse in a first resonant microwave cavity, passing the accelerated electron pulse through a drift space, and correcting the energy spread of the accelerated electron pulse in a second resonant microwave cavity by operating it out of phase by 90 degrees from the first resonant cavity.
Advantageously, this new type of Transmission Electron Microscope (TEM) with superior beam properties, based on relatively cheap technology, can be realized without the need of high-voltage electrostatic acceleration, while retaining sub-eV energy spread.
By using RF cavities for accelerating electrons, cumbersome high voltage techniques are no longer needed. By using a second set of RF cavities oscillating 90 degrees out of phase, the same energy spread, or even a lower energy spread, can be achieved as with high voltage electrostatic acceleration.
The invention provides techniques for producing electron beams with very high energy stability using resonant RF cavities. In one aspect, two RF cavities oscillating 90 degrees out of phase are used, where the second cavity reduces the energy spread of the beam accelerated by the first cavity. The electron beam is pulsed at a time scale much less than the cavity oscillation period. The technique allows for the realization of transmission electron microscopy, which requires sub-eV energy spread, without the need for conventional high-voltage electrostatic acceleration. Such a combination of RF cavities may be realized in an electron microscope.
Embodiments of the invention include a combination of (at least) two separate resonant RF cavities. In the present description, each cavity can also be implemented as a set of (RF) cavities. Thus, without loss of generality, the following description will refer to first and second cavities, with the understanding that this is equivalent to first and second sets of cavities.
In a preferred embodiment, first RF cavity accelerates electrons to the desired beam energy, in which are subsequently sent into the second cavity. In the second cavity, the electrons experience RF fields oscillating 90 degrees out of phase with the fields experienced in the first cavity. In the second cavity, deviations from the targeted beam energy due to variations in the RF power are corrected by decelerating electrons which have too much energy and accelerating electrons which have too little energy.
A pulsed electron source is used with a pulse duration much shorter than the RF period, which delivers pulses in phase with the oscillation of the RF fields in the cavities. The oscillatory fields in the RF cavities are phase-locked, which can be realized by driving them all with a single RF source. The pulsed electron source can be realized by either pulsed (sub-)ps laser photoemission, pulsed (sub-)ps laser photoionization, or by pulsed field emission with RF fields. By using mode-locked lasers, the laser pulses can be synchronized to the phase of the RF fields at the appropriate level of accuracy.
Embodiments of the present invention make it possible to use RF acceleration while retaining low energy spread and thus realize low-energy spread, radiofrequency electron microscopy. For example, a few 100 keV TEM can be realized without the need of high-voltage electrostatic acceleration, while retaining sub-eV energy spread.
Following is a description of the theoretical principles underlying embodiments of the present invention. Consider an RF pillbox cavity with electromagnetic (EM) fields resonantly oscillating in the TM010 mode, with the symmetry axis (z-axis) of the cylindrical cavity coinciding with the electron beam. In this case the electric field only has a field component in the z-direction:
(x,y,z,t)=E(x,y,z)sin(ωt+φ0) (1)
where ω is the RF oscillation frequency and φ0 is the RF phase at time t=0. Close to the z-axis the field in a pillbox cavity can be approximated by:
(x,y,z,t)≈E0 sin(ωt+φ0) (2)
This approximation simplifies calculations but is not essential for the invention. Other resonant modes can be used as well. The momentum pz that is gained by a charged particle with charge q during passage through the acceleration cavity is given by:
For φ0=π/2 and t0=π/2ω the maximum momentum gain is realized:
Assume a particle with mass m is injected into the cavity at t=−t0=−π/2ω with a velocity much smaller than the final velocity. This assumption is not essential but simplifies the calculations. Furthermore we neglect relativistic effects, which are not essential to explain the invention. The kinetic energy after acceleration is then given by:
As an example, consider a pillbox RF cavity, oscillating in TM010 mode at a frequency of ω/2π=3 GHz with an electric field amplitude E0=15 MV/m. When an electron is injected with zero velocity at the proper RF phase for maximum acceleration it will be accelerated in this field to U≈200 keV, comparable to beam energies typical for state-of-the-art TEMs. This can be achieved in a RF cavity Δz=−πqE0/mω2=2 cm in length with an RF power supply of a approximately 10 kW. By accelerating the electrons in several coupled cavities in a row the same final energy can be achieved with much less RF power.
Equation (3) shows how the final particle momentum after acceleration depends on φ0 and t0, i.e. on the synchronization of the moment of injection of the electron and the RF oscillation. For t0=π/2ω and φ0<<1:
RF phase instability Δφ0 will therefore translate in relative momentum and energy spread:
For state-of-the-art TEMs, an energy stability |ΔU/U|≤10−6 is desired, and therefore an RF HI phase stability |Δφ|≤10−3. For an RF frequency ω/2π=3 GHz this corresponds to 50 fs electron injection stability. This is within present-day technical possibilities.
The energy stability of RF acceleration is generally limited by the stability of the high-power RF amplifier: |(ΔU/U)amp|=|ΔE0/E0|≥10−4, which is the main reason RF amplification is generally not used in Transmission Electron Microscopy.
Since the final energy after RF acceleration depends strongly on the RF phase, the resulting beam is pulsed, with a pulse length much shorter that the RF period: τ<<2π/ω, and a maximum pulse repetition rate frep,max=ω/2π. In
The initial distribution 100 is an uncorrelated time-energy distribution with an initial pulse duration τi and a finite energy spread ΔUi=vzΔpz, with vz the average velocity of the bunch of particles. The pulse duration will increase as the pulse propagates, with the more energetic, faster particles moving ahead and the less energetic, slower particles lagging behind, resulting in a distribution 102 in which particle energy U and time t are, to a good approximation, linearly correlated: a chirped beam. After a drift length L the most energetic particles will outrun the least energetic ones by a time difference τ=L Δvz/vz2. The energies of the individual particles do not change and the area of the elliptical distribution in longitudinal phase space is conserved: as the ellipse is tilted it is stretched in time, it becomes both longer and thinner.
The drift space gives rise to an energy-time or longitudinal-velocity-position correlation, which can be undone with the RF correction cavity to produce distribution 104, which has reduced energy spread.
The linear correlation can be undone by the time dependent field of a second RF cavity in TM010 mode, operated with a field amplitude E1 and a phase φ1, so that the oscillating field close to the z-axis is given by:
(x,y,z,t)≈E1 sin(ωt+φ1){circumflex over (z)} (8)
If the pulse enters the second cavity at time t=−t1 and exits at time t=t1, the momentum change is given by
If the particles at the center of the pulse experience a phase φ1=0, no net momentum is gained after having passed through the cavity. The particles at the front of the pulse then experience a phase φ1=−ωτ/2 and those in the back a phase φ1=ωτ/2. If the second cavity is at a distance L form the acceleration cavity we have ωτ=ωL Δvz/vz2<<1 so that
Δpz,1=−qE1L·sin ωt1Δvz/vz2 (10)
To undo the linear energy-time correlation, the momentum change induced by the second cavity should be equal to:
Δpz,1=Δpz/2 (11)
which then results in an expression for the electric field amplitude E1 for undoing the linear energy chirp acquired during drift over a distance L:
For a well designed correction cavity ωt1=π/2 and therefore |E1,min|=U/qL. Example: for a beam energy U=400 keV and a distance L=0.5 m between accelerator cavity and correction cavity, a modest electric field amplitude E1=0.8 MV/m can is sufficient to undo the energy chirp and thus minimize the energy spread. Note that any energy spread ΔU present at the beginning of the drift space (also the energy spread due to the limited stability of the RF amplifier) will be minimized as long as ω L Δvz/vz2<<1.
The ultimately achievable minimum energy spread can be estimated using the fact that the product of pulse duration τ and energy spread ΔU is conserved for an unchirped beam, i.e., in absence of energy-time correlation (see
τi·ΔUi=τf·ΔUf (13)
For example: a 100 fs pulse with 10−4 relative energy spread can be converted into a 10 ps pulse with 10−6 relative energy spread. The achievable energy spread is limited by the fact that the final pulse length should be much smaller than the RF period, so that the electron pulse experiences an electric field in the second cavity that changes sufficiently linearly in time.
In practice, the effectiveness of the correction cavity, and thus the achievable minimum energy spread, is also limited by (1) variations of the electric field amplitude E1 in the correction cavity; (2) variations in the arrival time of the pulse in the correction cavity; (3) nonlinearity of the time dependence of the electric field experienced by the electrons in the correction cavity. These will now be discussed in more detail.
The dependence of the final energy spread on variation of the electric field amplitude of the correction cavity is given by ΔUf=ΔUi (ΔE1/E1), which is completely negligible for typical variations ΔE1/E1≈10−4, caused by the limited stability of the RF amplifier.
Jitter of the cavity phase Δφ1 with respect to the arrival time of the electron pulse will translate in arrival time jitter Δτf=Δφ1/ω, which amounts to less than 100 fs using presently available synchronization electronics. As a result Δτf/τf<<1, which makes this contribution negligible as well.
Around a zero crossing the electric field in the correction cavity can be approximated by Ez(t)=E1(ωΔt−(ωΔt)3/6+(ωΔt)5/120+ . . . ) where Δt is the time with respect to the zero crossing. For proper operation of the correction cavity the field experienced by the electrons should have a linear time dependence. Using |Δt|=τ/2 for the electrons in the front or the back of the pulse this implies (ωτf)2/24<<1. Assuming, for example, that we allow 1% nonlinearity, we find that τf≤0.5ω−1≈25 ps for a 3 GHz correction cavity.
Ideally the correction cavity should have an exactly linear time dependence, i.e. a saw tooth function, in which case τf≤150 ps for a 3 GHz cavity.
The linearity of the electric field around the zero crossing can be improved, however, by allowing higher harmonics in the cavity as well. For example, adding a field at the second harmonic with the proper amplitude:
Ez(t)=E1 sin(ωt)−(E1/8)sin(2ωt) (14)
will eliminate third order nonlinearities at the zero crossing. The field given by Eq. (14) is illustrated in
For a RF TEM according to embodiments of the present invention, a pulsed electron source is used, which produces ultrashort electron pulses that are synchronized to the RF phase of the cavities with a phase jitter Δφ≤ωτi. For an initial pulse length τi=100 fs the RF phase jitter should be Δφ≤2×10−3. The phase jitter can be accomplished by either creating the electron pulses (1) directly in phase with the oscillating RF field or by generating electron pulses by (2) photoemission or (3) photoionization with a mode-locked femtosecond laser that is synchronized to the RF oscillation. The choice of the electron source is important, as it determines the initial pulse duration, the beam current, and the beam emittance.
Using an RF cavity in TM110 mode as an ultrafast beam blanker, the continuous beam emitted by a standard field emission gun can be turned into a pulsed beam with conservation of the beam emittance and energy spread. The pulse train will have a repetition rate equal to the RF frequency and pulse durations of τi≤100 fs can be achieved straightforwardly. The current may be boosted by applying an RF accelerating field to the field emitting tip so that electrons will preferentially be emitted when the oscillating RF field is maximal. These pulses are not necessarily ultrashort, but an RF beam blanker may be used to cut out the central part of the pulse, where the current peaks.
By femtosecond laser photoemission from a flat metal photocathode 100 fs electron pulses are readily created, but with a relatively poor emittance due to the large emission area. The resulting beam quality is insufficient for high-resolution TEM. Femtosecond pulses may also be generated by illuminating a sharp field emission tip from the side by a femtosecond laser pulse, with the linear polarization of the laser pulse pointing in the acceleration direction. Field enhancement of the optical field then leads to the emission of ultra-low-emittance femtosecond electron pulses. By femtosecond photoionization of an ultracold, laser-cooled atomic gas in a magneto-optical trap, low-emittance femtosecond electron pulses can be generated.
The drift space between booster 302 and corrector 304 results in a correlation between position and longitudinal velocity in the electron pulses arriving at the corrector 304 (see
In practice, the availability of RF equipment and the sizes of the cavities allow the use of RF frequencies in the range 1-10 GHz. Low frequencies in principle allow further reduction of the energy spread but require large cavities and relatively large RF power.
The schematic drawing in
In the example of
For very small initial energy spreads, an impractically long drift space would be required to reduce the energy spread even further. By adding an additional decompression cavity, the length of the drift space can be reduced significantly.
This application is a 371 of PCT application PCT/EP2016/075,202 filed Oct. 20, 20016. PCT/EP2016/075,202 filed Oct. 20, 2016 claims the benefit of U.S. Provisional application 62/244,070 filed on Oct. 20, 2015.
Filing Document | Filing Date | Country | Kind |
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PCT/EP2016/075202 | 10/20/2016 | WO | 00 |
Publishing Document | Publishing Date | Country | Kind |
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WO2017/068030 | 4/27/2017 | WO | A |
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20180301317 A1 | Oct 2018 | US |
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62244070 | Oct 2015 | US |