The present invention relates to a system and method for providing the amplitude and phase delay of a sinusoidal signal.
In the present description, the term phase delay of a sinusoidal signal refers to the opposite of the value of the phase of this signal for a time of origin, also called initial time and corresponding to t=0, where t denotes the time variable.
Many applications require characterizing a sinusoidal signal by its amplitude and its phase delay. Such is the case in particular for characterizing the response of a resonator to an excitation signal, the resonator possibly being part of a vibrating accelerometer or a vibrating gyroscope.
One of the most common ways to do this is to digitize the sinusoidal signal and then analyze it, for example by Fourier transform. However, the digitization of a signal, which comprises sampling it at defined times and quantifying the values of the signal that are effective at those times, is carried out using analog-to-digital converters which are mixed electronic components, implemented in specific semiconductor technologies. For this reason, analog-to-digital converters require significant development in order to be qualified for space applications, which increases their cost.
To avoid these disadvantages of analog-to-digital converters, it is also known, in particular from U.S. Pat. No. 5,166,959, to characterize a sinusoidal signal by identifying the cancellation times of this signal. But such method does not allow determining the amplitude of the sinusoidal signal, but only its phase delay, and is not very accurate when the signal amplitude is low and/or has a low signal-to-noise ratio.
Patent WO 2008/022653 discloses a system for measuring a sine wave, which is based on dates of comparison of a signal to be identified with a reference signal.
On another hand, the article from R. Micheletti which is entitled «Phase Angle Measurement Between Two Sinusoïdal Signals», IEEE Trans. Instr. Meas. Vol. 40, No. 1, 1 Feb. 1991, pp. 40-42, XP055353815, proposes an algorithm for measuring the phase angle between two signals. The algorithm is based on a least-square method and is implemented from digital signals.
Finally, the article from B. Marechal et al., which is entitled «Direct Digital Synthetizer (DDS) design parameters optimisation for vibrating MEMS sensors», 2014 SYMPOSIUM ON DESIGN, TEST, INTEGRATION AND PACKAGING OF MEMS/MOEMS (DTIP), CIRCUITS MULTI PROJETS—CMP—1 Apr. 2014, pp. 1-5, XP032746454, proposes optimized designs for digital signal synthetizing units.
Based on this situation, an object of the invention consists in determining the amplitude and phase delay of a sinusoidal signal in a novel way, with no need for an analog-to-digital converter.
A related object of the invention consists of providing a system able to determine the amplitude and phase delay of a sinusoidal signal, which is inexpensive and which can be qualified for space applications at reduced cost.
Another object of the invention consists in providing such system having a significant part which can be shared among multiple channels which are each dedicated to determining the amplitude and phase delay of a sinusoidal signal different than that of the other channels, all channels operating continuously and simultaneously.
Finally, yet another object of the invention consists in providing such system that is accurate even for a sinusoidal signal of low amplitude, possibly superimposed on noise.
To achieve at least one of these or other objects, a first aspect of the invention proposes a system for providing an amplitude value and a phase delay value which relate to a signal to be measured having sinusoidal variations over time with a frequency F, this system comprising:
Thus, the system of the invention proceeds by identifying the phase values of the reference signal for which the signal to be measured becomes smaller than the reference signal or larger than that signal. From these phase values, the computation unit determines the amplitude and phase delay of the signal to be measured.
The system of the invention thus uses no analog-to-digital converter for determining the amplitude and phase delay of the sinusoidal signal to be measured.
The latch register and the synthesis unit for generating the reference signal are simple digital components that are inexpensive and can be qualified for space applications without significant development, once basic digital functions are qualified in a given technology. As for the comparator, it performs a mixed function but does so without difficulty, as it can be as simple as a differential pair of transistors.
The same is true for the computation unit, which may comprise or be implemented as a dedicated circuit or an application-specific integrated circuit, designated by the acronym ASIC, or as a programmable circuit, designated by the acronym FPGA, for which the feasible levels of integration have increased sharply in recent years while their costs have greatly decreased. Indeed, the amplitude and phase delay of the signal to be measured can be calculated mainly by operations of addition, multiplication, and subtraction of numbers, partly with numerical values that are fixed and which can therefore be stored beforehand. In a known manner, the design and description of the computation unit in the form of an ASIC or an FPGA can be done in a very flexible and cost-effective manner in languages such as VHDL or Verilog. In general, for the invention, at least one among the synthesis unit, the latch register, and the computation unit may advantageously be formed by such a dedicated circuit (ASIC) or by such a programmable logic circuit (FPGA).
Finally, since the times which are identified concern comparing the signal to be measured with a variable reference signal, these times can be identified with good accuracy even if the signal to be measured has low amplitude and has noise interference.
In preferred embodiments of the invention, the integer P may be equal to the integer Q plus one: P=Q+1.
Again in general for the invention, the computation unit may be adapted to calculate an in-phase amplitude value of the signal to be measured, equal to a·cos Φ where Φ is the value of the phase delay of the signal to be measured and a is a quotient of the amplitude of the signal to be measured divided by the amplitude of the reference signal, and a quadrature amplitude value of the same signal to be measured, equal to a·sin Φ. These values can be calculated from a system of affine equations having coefficients, for the in-phase amplitude and quadrature amplitude of the signal to be measured, which depend on the selected values for the phase of the reference signal.
According to a first design possible for the computation unit, it can perform an exact resolution of the system of affine equations having as unknown quantities the in-phase amplitude values a·cos Φ and the quadrature values a·sin Φ of the signal to be measured. In such case, the computation unit may be adapted to calculate the coefficients of the system of affine equations from the selected values for the phase of the reference signal, and to calculate the values of the in-phase amplitude and quadrature amplitude of the signal to be measured by applying an algorithm for solving this system of affine equations. In particular, an affine equation inversion algorithm or a least-square resolution algorithm may be implemented by the computation unit in order to solve the system of affine equations having the in-phase and quadrature amplitude values of the signal to be measured as unknown quantities.
According to a second design possible for the computation unit, this unit can achieve a first-order resolution, as a function of the amplitude of the signal to be measured, of the system of affine equations having the in-phase amplitude value a·cos Φ and quadrature amplitude value a·sin Φ of the signal to be measured as unknown quantities. Such method is suitable when the amplitude of the signal to be measured is smaller than that of the reference signal. In this case, the computation unit can be adapted to determine approximate values for the coefficients of the in-phase amplitude and quadrature amplitude in the system of affine equations, these approximate values of the coefficients being independent of the selected values for the phase of the reference signal, and the selected values for the phase of the reference signal constituting affine terms of the system of affine equations. Then, the computation unit may further be adapted to calculate approximate values of the in-phase amplitude and quadrature amplitude of the signal to be measured, as simple linear combinations of the selected values for the phase of the reference signal.
According to a third design possible for the computation unit, this unit can achieve a resolution of the system of affine equations by decomposing the phase values of the reference signal which are selected by the latch register, into fundamental and harmonic components. Specifically, the computation unit may be adapted to calculate amplitudes of fundamental in-phase and quadrature components and of harmonic components, for the selected values for the phase of the reference signal. Then, the computation unit may further be adapted to calculate approximate values of the in-phase amplitude a·cos Φ and quadrature amplitude a·sin Φ of the signal to be measured, from linear combinations of the amplitudes of the fundamental in-phase and quadrature components and the harmonic components of the selected values for the phase of the reference signal.
Preferably, when the third design of the computation unit is used, the computation unit may be adapted to calculate approximate values for the amplitudes of the fundamental in-phase and quadrature components and the harmonic components of the selected values for the phase of the reference signal, as combinations of additions and subtractions of the selected values for the phase of the reference signal. It can then further be adapted to calculate the approximate values for the in-phase amplitude a·cos Φ and quadrature amplitude a·sin Φ of the signal to be measured, from linear combinations of the approximate values for the amplitudes of the fundamental in-phase and quadrature components and the harmonic components of the selected values for the phase of the reference signal. In such case, the integer P is advantageously a multiple of 60.
When multiple sinusoidal signals have to be characterized simultaneously and continuously, one acquisition channel may be separately dedicated to each of these signals, but the synthesis unit may be shared between all the acquisition channels in order to supply each of them with the reference signal and the instantaneous values of its phase. Thus, such system which is adapted to provide amplitude and phase delay values relating to a plurality of signals to be measured, each having sinusoidal variations over time, all with the frequency F, may comprise acquisition channels which are respectively and individually dedicated to the signals to be measured, each acquisition channel comprising a comparator and a latch register adapted and connected as described above, separately from the other acquisition channels. The synthesis unit may then be common to all the acquisition channels, for transmitting the reference signal simultaneously to all the comparators and for transmitting the instantaneous values of the phase of the reference signal simultaneously to all the latch registers. Possibly, the computation unit may also be common to all the acquisition channels, for determining an amplitude value and a delay value separately for each signal to be measured, to which one of the acquisition channels is dedicated.
In particular embodiments of the invention, the system may comprise:
The system may then be adapted to provide the excitation signal to an external device, and to collect the signal to be measured as a response of this external device to the excitation signal. To do so, the first and second accumulation increments are positive integers, such that a quotient of the first accumulation increment divided by Q is equal to a quotient of the second accumulation increment divided by P, and is also equal to a positive integer called cycle increment. In this manner, the frequency F may be equal to a first product of a frequency of the clock signal multiplied by the integer Q and by the cycle increment, divided by 2NA where NA is the number of bits used in each cyclic accumulator, and the reference frequency Fref may be equal to a second product of the frequency of the clock signal multiplied by the integer P and by the cycle increment, divided by 2NA.
The output from the second cyclic accumulator is then connected to the input of the latch register of each acquisition channel in order to transmit the instantaneous values of the phase of the reference signal, and the output of the second signal-shaping unit is simultaneously connected to the input of the comparator of each acquisition channel in order to transmit the reference signal itself.
A second aspect of the invention proposes a method for providing an amplitude value and a phase delay value which relate to a signal to be measured having sinusoidal variations over time with a frequency F. The method comprises the following steps:
Such a method can be carried out using a system that is according to the first aspect of the invention.
Advantageously, a method according to the invention may be used for characterizing a response of a resonator vibrated by an excitation signal having a sinusoidal form of time-variations with frequency F. The signal to be measured is then formed by the response of the resonator to the excitation signal. In particular, the resonator may be part of a vibrating accelerometer or a vibrating gyroscope, and the values of the amplitude and phase delay relating to the signal to be measured are then used to calculate acceleration or rotational speed values of a device or a vehicle carrying the accelerometer or gyroscope.
Other features and advantages of the invention will become apparent from the following description of some non-limiting exemplary embodiments, with reference to the accompanying drawings, in which:
In
A system according to the invention is intended to characterize a sinusoidal signal, called the signal to be measured and denoted s(t), for which the time-variation frequency is assumed to be known. This signal to be measured is therefore of the form:
s(t)=A·sin(2π·F·t−Φ) (1)
where t denotes time, F is the known frequency of the signal s(t), and A and Φ are respectively the amplitude and the phase delay of the signal s(t). The object of the invention is therefore to determine the values of the amplitude A and the phase delay Φ.
To do so, the invention makes use of another sinusoidal signal, called the reference signal and denoted r(t), which is fully known and is generated so as to be in continual phase coherence with the signal to be measured s(t). Continual phase coherence between the signals s(t) and r(t) is understood to mean a property of these signals which consists of each evolving according to its respective frequency, starting from a phase difference which initially exists between the two signals. In other words, each signal has a frequency stability such that it retains, at least over the time required to characterize the signal to be measured s(t), a fixed value for its own phase delay. By appropriately selecting the initial time defined as t=0, the reference signal can be written in the form:
r(t)=−Aref·sin(2π·Fref·t) (2)
In other words, the initial time t=0 is defined such that the reference signal r(t) has a phase delay equal to π. Aref and Fref are respectively the amplitude and the time-variation frequency of the reference signal r(t), assumed to be known. In the following, the phase of the reference signal r(t) is denoted ψ(t): ψ(t)=2π·Fref·t.
In
Actually, for many applications of the invention, the signal to be measured s(t) is a response of a resonator, referenced 200, denoted RESON, and also commonly referred to as a forced oscillator, to an excitation signal. This excitation signal, denoted E(t), therefore has the same frequency F as the signal to be measured s(t). The excitation signal E(t) and signal to be measured s(t) are therefore naturally in continual phase coherence with one another, and it is then necessary to ensure that the excitation signal E(t) and the reference signal r(t) are themselves in continual phase coherence with one another. A preferred way to ensure such continual phase coherence between the excitation signal E(t) and the reference signal r(t) consists in generating the latter also by using the synthesis unit 1. To do this, the synthesis unit 1 may also comprise another cyclic accumulator 102, called first cyclic accumulator in the general part of this description, which also receives as input the periodic signal supplied by the clock 100. The cyclic accumulator 102 outputs another linear ramp which is reset automatically, to frequency F=FCLK·W1/2NA, where W1 is another fixed accumulation increment. W1 and W2 were respectively called the first and second accumulation increments in the general part of the present description.
The signal-shaping unit 110 transforms the ramp produced by the cyclic accumulator 102 into another sinusoidal signal, which has the frequency F. This signal-shaping unit 110 may also be implemented in the form of a digital lookup table which is combined with a digital-to-analog converter, or in the form of a filtering transformer, etc. The signal produced by the unit 110, and then possibly amplified by an amplifier 112, is the excitation signal E(t).
The accumulation increments W1 and W2 are positive integers, further selected such that W1/Q=W2/P=W0, where P and Q are two fixed, non-zero positive integers, with P greater than Q. Thus: Fref=FCLK·(P·W0)/2NA, F=FCLK·(Q·W0)/2NA, and therefore Fref=F·P/Q. The frequency Fref of the reference signal r(t) is therefore higher than the frequency F of the signal to be measured s(t). For example, the clock frequency FCLK may be equal to 300 MHz, and the number NA of bits used in the cyclic accumulators 102 and 103 may be 32. In such case, the ratio of Fref to FCLK can be about 1/1000 for example.
In addition, the integers P and Q may advantageously be selected such that W0 is also a positive integer, called cycle increment. In this case, the synthesis unit 1 may further comprise another cyclic accumulator, referenced 101 in
The signal to be measured s(t) is collected from the resonator 200, possibly through an amplifier 120. Examples for a resonator 200 will be given below, at the end of this description. The signal to be measured s(t) is then processed by the acquisition channel 2, then by the computation unit 3, denoted CALC. This unit produces numerical values as results for the amplitude A and the phase delay Φ of the signal to be measured s(t).
The acquisition channel 2 comprises a comparator 130, denoted COMP., and a latch register 140, denoted REG. The comparator 130 receives the reference signal r(t) and the signal to be measured s(t) at two separate inputs. It outputs a comparison signal which has transitions whenever the reference signal r(t) becomes greater than the signal to be measured s(t). Although the remainder of the present description is in accordance with this operation of the comparator 130, an equivalent operation can be achieved with a comparator which produces transitions in the comparison signal whenever the signal to be measured s(t) becomes greater than the reference signal r(t). The comparison signal is then transmitted to the latch register 140 which simultaneously receives, on a separate input, the instantaneous value of the phase ψ(t) of the reference signal r(t), from the cyclic accumulator 103. The latch register 140 then successively outputs the values of the phase ψ(t) at the times when the reference signal r(t) has become greater than the signal to be measured s(t). These values, denoted ψk and numbered with the integer k starting at 1, are then transmitted to the computation unit 3.
The computation unit 3 is advantageously implemented as a dedicated circuit, or ASIC, or a programmable logic device, or FPGA. Possibly, the functions of the comparator 130 and latch register 140 can also be executed by this ASIC or this FPGA.
In general for the invention, the integer P may be equal to the integer Q plus one: P=Q+1. For example, Q may be equal to 3 and P may be equal to 4.
The equations satisfied by the times tk are s(tk)=r(tk), which is:
A·sin[2π·(Q/P)·Fref·tk−Φ]=−Aref·sin(2π·Fref·tk) (3)
According to the operation of the acquisition channel 2:
2π·Fref·tk=ψk+2·kπ−π (4)
The equations (3) then become, for each value of k:
A·sin[(Q/P)·(ψk+(2k−1)π)−Φ]=Aref·sin(ψk) (5)
By using the notation a=A/Aref and αk0=(Q/P)·(2k−1)π, the equations which are satisfied by the phase values ψk are, as reproduced in
a·sin[αk0+(Q/P)·ψk−Φ]=sin(ψk) (6)
The value Aref of the amplitude of the reference signal r(t) is stored for later use by the computation unit 3. By expanding the sine of the first term, we obtain:
a·sin[αk0+(Q/P)·ψk]·cos(Φ)−a·cos[αk0+(Q/P)·ψk]·sin(Φ)=sin(ψk) (7)
The following change of variables is then made, which introduces the in-phase amplitude X and the quadrature amplitude Y of the signal to be measured s(t):
X=a·cos(Φ) (8a)
Y=a·sin(Φ) (8b)
For each value of k, the equations (7) then become, as a function of the new unknown quantities X and Y which replace Aref and Φ in a first phase of the resolution:
sin[αk0+(Q/P)·ψk]·X−cos[αk0+(Q/P)·ψk]·Y=sin(ψk) (9)
which corresponds to the matrix notation of
Solving the system of equations (9) provides the values of the in-phase amplitude X and quadrature amplitude Y of the measured signal s(t). From these values for X and Y, equations (8a) and (8b) give the values of a and of the phase delay Φ, for example by (X2+Y2)1/2 and Φ=Arctan(Y/X), then the amplitude A of the signal to be measured s(t) is calculated as the product a·Aref. As a result, the rest of this description is focused on solving the system of equations (9), corresponding to
Exact Resolution:
The system of equations (9) corresponding to the matrix notation of
As the coefficients sin[αk0+(Q/P)·ψk] and −cos[αk0+(Q/P)·ψk] are variable according to the phase values ψk supplied by the acquisition channel 2, the calculations of the sine and cosine values which constitute the coefficients of X and Y in the equations (9) may consume time and computing resources. It is possible to replace the sine and cosine functions by their finite expansions, preferably at least up to order five in order to limit the resulting errors in the values of X and Y.
Approximate Resolution for Small Values of a:
This method can be applied when the amplitude Aref of the reference signal r(t) is or can be adjusted to be much greater than the amplitude A of the signal to be measured s(t). In other words: a<<1, and from equation (6), the phase values ψk are much lower than π and therefore also much lower than the values of αk0. Under these conditions, the equations (6) become:
a·sin(αk0−Φ)≈ψk (10)
in other words as a function of the unknown quantities X and Y:
X·sin(αk0)−Y·cos(αk0)≈ψk (11)
which corresponds to the matrix notation of
This time, the respective coefficients sin(αk0) and −cos(αk0) of X and Y in the affine equations (11) are constant. They can therefore be pre-calculated. The 2×2 matrix of the system formed by any two of the equations (11) can then also be inverted beforehand, and the inverse matrix can be saved in order to be directly available to the computation unit 3. The values of the amplitudes X and Y can then be simply calculated by applying this inverse matrix to the second terms ψk of the two equations (11) used. Such saving of the inverse matrix beforehand may also be used for the least-square resolution method.
Fourier Series Decomposition Method
As already seen, the series of phase values ψk is periodic, with 1/Fcyc as the time-period. The successive values of αk0 as well. One therefore seeks to solve the system of equations (9) by expressing the phase values ψk as a linear combination of sin(αk0), cos(αk0), sin(2·αk0), cos(2·αk0), sin(3·αk0), cos(3·αk0), . . . meaning:
ψk=Σi=1,2,3, . . . ,P[Hip−cos(i·αk0)+Hiq·sin(i·αk0) (12)
which corresponds to the notation expanded in
However, equation (9) can be written:
[X·sin(αk0)−Y·cos(αk0)]·cos((Q/P)·ψk)+[X·cos(αk0)+Y·sin(αk0)]·sin((Q/P)·ψk)−sin(ψk)=0 (13)
By expanding cos((Q/P)·ψk), sin((Q/P)·ψk) and sin(ψk) into Fourier series of (Q/P)·ψk and ψk, and transferring the expression (12) for ψk, then converting all terms of the form sinn(i·αk0) and cosn(i·αk0) into linear combinations of terms of the form sin(n′i·αk0) and cos(n′·i·αk0), one obtains a zero linear combination of the terms sin(n·i·αk0) and cos(n·i·αk0). Each of the factors of this linear combination must therefore be zero, which leads to a system of affine equations whose unknown quantities are the coefficients Hip and Hiq, i describing the set of non-zero natural integers less than or equal to P. The first coefficients of the decomposition of ψk into Fourier series which are thus obtained are:
H1p=X+[(P2−Q2)/(8P2)]·X3+[(P2−Q2)/(8P2)]·X·Y2+term in X4+ . . . (14a)
H2p=(Q/2P)·X2+term in X4+ . . . (14b)
H3p=[(P2−9Q2)/(24P2)]·X3+[(P2−9Q2)/(8P2)]·X·Y2+term in X4+ . . . (14c)
H4p=[(P2Q−4Q3)/(2P3)]·X2·Y2+term in X4+ . . . (14d)
H5p=−[(9P4−250P2Q2+625Q4)·Y2/(192P4)]·X3+term in X5 (14e)
. . .
H1q=Y+[(P2−Q2)/(8P2)]·X2·Y+term in Y3+ (14f)
H2q=(Q·X/P)·Y+term in Y3+ . . . (14g)
H3q=[(−P2+9Q2)/(8P2)]·X2·Y+term in Y3+ . . . (14h)
. . .
Moreover, the coefficients Hip and Hiq of the Fourier series decomposition can be calculated in the usual manner from the phase values ψk supplied by the acquisition channel 2. However, it is possible to calculate approximate values of the coefficients H1p and H1q more quickly, denoted H′1p and H′1q, by applying the first matrix relation of
By identifying the first coefficients Hip and Hiq of the Fourier decomposition of the phase values ψk, calculated from these latter as supplied by the acquisition channel 2, with the expressions of equations (14a-14h), the amplitudes X and Y can be obtained in an approximate manner by combining several of the equations (14a-14h) as follows:
X≈H1p+3·H3p·(P2−Q2)/(P2−9·Q2)+H5p·(P2−Q2)/(P2−25·Q2) (15a)
Y≈H1q−H3q·(P2−Q2)/(P2−9·Q2) (15b)
Thus, an approximate value of X can be calculated simply by linearly combining, with combination factors which are fixed and predetermined, the values of the three amplitudes of Fourier components H1p, H3p and H5p only. In parallel, an approximate value of Y can be calculated simply by linearly combining the values of the two amplitudes of Fourier components H1p and H3q only. For the combinations of equations (15a-15b), the first neglected terms are in X·Y2. Other combinations may alternatively be used to calculate approximate values of the amplitudes X and Y, neglecting terms in X3 instead of those in X·Y2.
Note that it is possible to maximize the value of the in-phase amplitude X of the signal to be measured s(t) relative to the quadrature amplitude Y by initially applying a rotation between the P phase values ψk. Such a rotation amounts to shifting the initial time t=0 in order to reduce the phase delay Φ. This minimizes the residual cross terms in X·Y2 in Hip.
When the set of resonators 200 is an accelerometer, it may be composed of at least three beams which are each tensioned by a inertial mass, and are oriented differently from the other beams, for example in three perpendicular directions. Each beam can be made to oscillate transversely by the excitation signal E(t), and the signals to be measured s1(t), s2(t) and s3(t) may characterize the instantaneous displacements by transverse vibrations for the three beams, respectively. Then, the skilled person knows how to determine the three components of a driving acceleration from the values of the amplitudes and phase delays A1 and Φ1, A2 and Φ2, and A3 and Φ3 respectively, of the signals to be measured s1(t), s2(t) and s3(t).
When the resonator 200 is a gyroscope, it may consist of a vibrating structure having at least four eigenmodes that can be coupled by a Coriolis force field. The signals to be measured s1(t), s2(t) and s3(t) can then characterize the couplings between one excitation eigenmode and three distinct eigenmodes that are coupled to the excitation eigenmode by the Coriolis force field. The excitation signal E(t) is applied to the excitation eigenmode, and the signals of instantaneous displacements related to the three other vibration eigenmodes constitute the three signals to be measured s1(t), s2(t) and s3(t). Then, the skilled person knows how to determine the three components of a driving rotation from the values of the amplitudes and phase delays A1 and Φ1, A2 and Φ2, and A3 and Φ3 respectively of the three signals to be measured s1(t), s2(t) and s3(t).
The driving acceleration or the driving rotation that is thus measured may result in particular from the movement of a device or vehicle carrying the accelerometer or gyroscope, such as an aircraft, a satellite, a spacecraft, etc.
Number | Date | Country | Kind |
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16 55330 | Jun 2016 | FR | national |
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PCT/FR2017/051464 | 6/9/2017 | WO | 00 |
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WO2017/212187 | 12/14/2017 | WO | A |
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