One or more embodiments of the present invention generally relate to a method for decoding symbols coded by using the so-called CPM (Continuous Phase Modulation) scheme. More specifically one or more embodiments relate to such a method developed for some Bluetooth® standards, and for Bluetooth BR (Basic Rate) and BLE (Bluetooth Low Energy).
CPM is widely used in communications for their power and spectral efficiency.
Advantageously, those communications can be easily demodulated using a simple discriminator receiver. This demodulator usually referred to as LDI, is based on a Limiter-Discriminator Integrator. It shows a very low complexity, but suffers from a considerable loss (>6 dB) over the optimal receiver.
On the contrary, the optimal receiver has an extremely high complexity in particular when some impairments/mismatches, such as frequency offset, have to be estimated jointly along with the demodulation.
Bluetooth BR and BLE modulations are based on Gaussian Frequency-Shift Keying (GFSK), this latter being one type of CPM scheme.
It is thus an object of one or more embodiments of the invention to provide a decoding method of an RF signal bearing a sequence of symbols modulated by using CPM, and more particularly GFSK, with a performance gain, for instance of more than 4 dB compared to the LDI demodulator, while restricting complexity, for instance to a linear scale, i.e. to O(n) flops as total complexity per received symbol.
More particularly, in a theoretical way, at the level of the emitter, a GFSK complex baseband signal is in the form:
s
BB(t)=GejΦ(t,h,a)
wherein G is the amplitude of the signal and
wherein Φ(t, h, a) is the modulated phase carrying the information and is given by:
where T is the symbol duration, a={ai} is the information sequence, and h is called the modulation index.
Note that, for Bluetooth BR technology, the modulation index varies between 0.27 and 0.35, whereas, for BLE technology, the modulation index is approximatively equal to 0.5.
For instance, the phase pulse q(t) is obtained as the integral of the Gaussian frequency pulse g(t):
q(t)=∫−∞tg(τ)dτ
As the Gaussian frequency pulse g(t) can be assumed to have a finite duration comprised into the interval [0, LT], the phase pulse q(t) also has a finite length and more particularly q(t)=½ if t>LT. For instance, L is equal to 3 for Bluetooth BR technology.
Owing to the time-limited property of the phase pulse q(t), the modulated phase can be expressed as:
Φ(t,h,a)=πhΣi=−∞n−Lai+2πhΣi=n−L+1naiq(t−iT) for nT≤t≤(n+1)T
where the first term is the accumulated phase up to the time (n−L) T.
By further writing δn−L=Σi=−∞n−Lai, the modulated phase can be expressed as:
Φ(t,h,a)=πhδn−L+2πhΣi=0L−1an−iq(t−(n−1)T) for nT≤t≤(n+1)T
Already in a theoretical way, at the level of the receiver, taking into account the real world anomalies, the continuous time received signal can be expressed in the form:
y(t)=AejΦ(t,h,a)+jωt+jθ
Where:
is a possible measure of the Signal-to-Noise Ratio (SNR), and
If an interferer/jammer is part of a BT (Bluetooth Technology) packet, the interfering signal can for instance be expressed in the following form: i(t)=Bejϵ(t), where ϵ(t) is another GFSK signal representing an interferer/jammer and so that the ratio
is a possible measure of the co-channel Channel-to-Interfering Ratio (CIR).
Let's call Ts the sampling time period of the continuous time signal y(t) as received by the receiver.
The continuous time signal y(t) is sampled at the frequency fs=1/Ts=M/T where M is the oversampling factor and T is the symbol duration. Then, the samples received during the symbol duration T of the nth symbol may be expressed in the following form:
y(kTs)=yk=Aej(Φ
wherein
Φk(h)=πhδn−L+2πhΣi=0L−1an−iq(kTs−(n−i)T) for nM≤k≤(n+1)M.
By using vector notations, we obtain:
wherein
Φn=[ΦnMΦnM+1 . . . ΦnM+(M−1)]T and
q
i=[q(iT)q(iT+Ts) . . . q(iT+(M−1)Ts]T.
In view of the preceding, it is a further object of one or more embodiments of the invention to estimate the set of variables and parameters {a1, . . . , an, h, ω, Φ0} which is subject to minimum latency, minimum Mean Squared Error (MSE) and maximum robustness against interferences, with received samples {y1, . . . , y(n+1)M} being given.
Further objects, features and advantages of one or more embodiments of the present invention will become apparent to the ones skilled in the art upon examination of the following description in reference to the accompanying drawings. It is intended that any additional advantages be incorporated herein.
According to a first aspect, one or more embodiments of the invention relate to a method for decoding an RF signal bearing a sequence of transmitted symbols modulated by using continuous phase modulation, the method comprising, at the level of a receiver of said RF signal:
The method according to its first aspect is a computer-implemented method.
As shown by the simulation results discussed below with reference to
According to an embodiment, and in accordance with the formalism as introduced into the “background” part, the system of three linear equations is in the following matrix form:
with the matrix coefficients being in the form:
B
(n)=Σk∈I(n)kαkrk or B(n)=B(n−1)+Σk∈I(n)\I(n−1)kαkrk
C
(n)=Σk∈I(n)αkrk or C(n)=B(n−1)+Σk∈I(n)\I(n−1)αkrk
D
(n)=Σk∈I(n)αk2rk or D(n)=B(n−1)+Σk∈I(n)\I(n−1)αk2rk
F
(n)=Σk∈I(n)k2rk or F(n)=B(n−1)+Σk∈I(n)\I(n−1)k2rk
G
(n)=Σk∈I(n)krk or G(n)=B(n−1)+Σk∈I(n)\I(n−1)krk
H
(n)=Σk∈I(n)|yk| or H(n)=B(n−1)+Σk∈I(n)\I(n−1)|yk|
v
1
(n)=Σk∈I(n)αkrkΨk or v1(n)=v1(n−1)+Σk∈I(n)\I(n−1)αkrkΨk
v
2
(n)=Σk∈I(n)krkΨk or v2(n)=v2(n−1)+Σk∈I(n)\I(n−1)krkΨk
v
3
(n)=Σk∈I(n)rkΨk or v3(n)=v3(n−1)+Σk∈I(n)\I(n−1)rkΨk
αk=πΣi=0n−Lâi+2πΣi=1L−1ân−1q(kTs+iT−nT) with nM≤k≤(n+1)M
It is thus provided a decoding method that is able to estimate the model parameters in a recursive manner.
According to an advantageous embodiment, an (m+1)th received symbol is detected by:
According to the latter advantageous embodiment, and in accordance with the formalism as introduced into the “background” part:
Γn=πĥ(n){circumflex over (δ)}n−L1+2πĥ(n)Σi=1L−1ân−iqi+{circumflex over (Φ)}0(n)+{circumflex over (ω)}(n)cn with
â
n=sign(pnT[Ψn−Γn+ρnΩn])
where:
Optionally, one or more embodiments of the invention may have one or more of the following facultative features that can be used separately or in combination.
According to an optional embodiment of the first aspect of the invention, the unknowns {ĥ(n), {circumflex over (ω)}(n), {circumflex over (Φ)}0(n)} are as estimated by solving the system of three linear equations and/or as estimated in function of given values of said model parameters {h, ω, Φ0}.
According to another optional embodiment of the first aspect of the invention, said sequence of symbols {ân} comprises at least one among a sequence of presumed symbols and a sequence of symbols corresponding to samples {yk} of the received RF signal. Said presumed symbols may be chosen among training symbols and a sequence of received symbols as detected According to another optional embodiment of the first aspect of the invention, said continuous phase modulation is a Gaussian Frequency-Shift Keying (GFSK) modulation.
According to another aspect, one or more embodiments of the invention also relate to a decoder for decoding an RF signal bearing a sequence of transmitted symbols modulated by using continuous phase modulation. The decoder comprises a phase extractor, an estimator of model parameters {h, ω, Φ0}, a symbol detector, and a demultiplexer, designed altogether for implementing the method as introduced above.
According to another aspect, one or more embodiments of the invention further relate to a computer-program product that contains software program instructions, where execution of the software program instructions by at least one data processor results in performance of operations that comprise execution of the method as introduced above.
The following detailed description of the invention refers to the accompanying drawings. While the description includes exemplary embodiments, other embodiments are possible, and changes may be made to the embodiments described without departing from the spirit and scope of the invention.
Herein a system of equations may be defined as a finite set of equations for which common solutions exist.
The term “training symbol” denotes a symbol making part of the sequence of symbols to be retrieved at the level of the receiver and already known by the receiver.
As shown in
The phase extractor 11 is designed for extracting the instantaneous phase Ψk of each sample yk of the sampled RF signal.
The estimator 12 is designed for estimating parameters {h, ω, Φ0} of a set of parameters among which a first parameter h characterizing a modulation index, a second parameter co characterizing a carrier frequency offset and a third parameter (Do characterizing an initial phase offset. These three parameters are called model parameters {h, ω, Φ0}. They are estimated by solving a system of three linear equations whose:
The symbol detector 13 is designed for detecting, within the received RF signal, received symbols corresponding to said transmitted symbols of the sequence. Its fundamental task is to reliably recover the transmitted symbols from the received RF signal.
More particularly, the symbol detector 13 detects an (m+1)th received symbol by:
Said measured phases {Ψk} have been extracted from the received RF signal by said phase extractor 11. More particularly, the phase extractor 11 measures phases {Ψk} of samples {yk} of the RF signal received from time mT to time (m+1)T, for the symbol detector 13 to detect the (m+1)th received symbol.
The symbol detector 13 is more particularly be comprised of a phase reconstructor depicted by the “Receive phase reconstruction” block and a comparator depicted by the “Projection” block, on
The phase reconstructor of the symbol detector 13 is designed for reconstructing the phase that a received symbol is presumed to have according to the model parameters {h, ω, Φ0} as estimated by the estimator 12. It computes said predicted phase Γm.
The comparator of the symbol detector 13 is designed for comparing:
Owing to such a comparison, an error term is computed that characterizes the mismatch or rather the level of matching of both phases.
The estimator 12 of the model parameters {h, ω, Φ0} has been more particularly derived by maximizing, with some approximations, the likelihood criterion below:
where, as already introduced above:
Φk(h)=πh{circumflex over (δ)}n−L+2πhΣi=0L−1ân−iq(kTs−(n−i)T) for nM≤k≤(n+1)M, and
and assuming that the set {âi} up till time nT are known as estimates of the symbols {ai}.
More particularly, assuming that:
the estimate at time nT of the model parameters {h, ω, Φ0} are computed with the following system of three linear equations:
or, equivalently, with the expanded expressions:
where {ĥ(n), {circumflex over (ω)}(n), {circumflex over (Φ)}0(n)} are the unknowns of the system and are respectively functions of said model parameters {h, ω, Φ0}, and wherein the matrix coefficients can be computed in a recursive way as:
B
(n)=Σk∈I(n)kαkrk or B(n)=B(n−1)+Σk∈I(n)\I(n−1)kαkrk
C
(n)=Σk∈I(n)αkrk or C(n)=B(n−1)+Σk∈I(n)\I(n−1)αkrk
D
(n)=Σk∈I(n)αk2rk or D(n)=B(n−1)+Σk∈I(n)\I(n−1)αk2rk
F
(n)=Σk∈I(n)k2rk or F(n)=B(n−1)+Σk∈I(n)\I(n−1)k2rk
G
(n)=Σk∈I(n)krk or G(n)=B(n−1)+Σk∈I(n)\I(n−1)krk
H
(n)=Σk∈I(n)|yk| or H(n)=B(n−1)+Σk∈I(n)\I(n−1)|yk|
v
1
(n)=Σk∈I(n)αkrkΨk or v1(n)=v1(n−1)+Σk∈I(n)\I(n−1)αkrkΨk
v
2
(n)=Σk∈I(n)krkΨk or v2(n)=v2(n−1)+Σk∈I(n)\I(n−1)krkΨk
v
3
(n)=Σk∈I(n)rkΨk or v3(n)=v3(n−1)+Σk∈I(n)\I(n−1)rkΨk
where I(n) is a subset of indices between 0 and nM, rk should be equal to |yk|, but could also be set a constant (for instance equal to 1, but preferably adapted in function of the signal-to-noise ratio), and ak is given by:
αk=πΣi=0n−Lâi+2πΣi=1L−1ân−1q(kTs+it−nT) with nM≤k≤(n+1)M
Note that αk can be viewed as a derivative of Φk(h) over h.
The demultiplexer 14 is used as usually within known decoders. It is used to switch from a training phase to a blind phase. During the training phase, the parameter estimation is done using a priori known transmitted symbols. In BT such a training phase happens for e.g., during the reception of the synchronization word which is known by the receiver. During the blind phase, the demodulator becomes a decision-directed algorithm.
The symbol detector 13 is more particularly designed for obtaining an estimation bm+1 of the transmitted symbol am+1 by “comparing” the phase of the samples received during the time period [mT . . . (m+1)T] with some reconstructed/predicted phase computed from the a-priori knowledge of the previous symbols up till time mT and the model parameters estimates at time mT, according to the following proceedings.
Let's call Ψn the vector of measured phases of the received signal, from time nT to (n+1)T:
Ψn=angle([ynMynM+1. . . ynM+(M−1)]T)=[ΨnMΨnM+1 . . . ΨnM+(M−1)]T
The parameter M is the oversampling factor. For instance, M=3. Note that according to the model described in the “background” section:
where cn=[nM, nM+1, . . . , nM+M−1]T and θ( ) is a non-linear function.
The detection is performed in 2 steps.
First, the reconstruction block computes a predicted phase Γn from the estimated sequence {âi} up to time (n−1)T:
Then, the estimate ân of symbol an is obtained through the closed form equation below:
â
n=sign(pnT[Ψn−Γn+ρnΩn]).
The component ρnΩn serves as robust regularization to interference and transmit filters as this parameter penalizes the slope of the phase of the received RF signal.
Ωn contains the derivative of the measured phases, Ωn=[ΦnM−ΦnM−1), (ΦnM+1−ΦnM) . . . (ΦnM+(M−1)−ΦnM+(M−2))]T and ρn is a user defined parameter.
pn is a projection vector. It can take different values such as:
where ⊙ is the Hadamard operator and rn is equal to one chosen among |yn|=[ynMynM+1 . . . ynM+(M−1)]T and a user defined constant.
The method according to the first aspect of the invention may begin by anyone of the estimation step(s) and the detection step(s) depending on the encountered context. Some example embodiments are briefly discussed below, that are not intended to be limiting.
If the first symbols of the transmitted sequence are already known at the level of the receiver, some estimating steps can be implemented first in order to achieve estimates of the model parameters, during what could be called a learning phase. As shown on
If the model parameters or estimates thereof are given or already known, for instance with reference to a previous decoding, the unknowns {ĥ(n), {circumflex over (ω)}(n), {circumflex over (Φ)}0(n)} can be estimated in function of the given values of said model parameters or estimates and the method could be implemented by beginning with some detecting steps, with using the unknowns {ĥ(n), {circumflex over (ω)}(n), {circumflex over (Φ)}0(n)} as estimated.
The method further allows for switching anytime and as often as needed/desired between estimation and detection steps. In this sense, symbols as previously detected can serve for a new estimation of the model parameters and the previously estimated model parameters can serve for detecting newly received symbols.
The method according to one or more embodiments is designed for decoding symbols coded by using the so-called CPM. Indeed, the assumptions made for reducing the likelihood criterion to the above given system of three linear equations is comprised of the assumption that the RF signal is a constant amplitude signal. This is the main or even the single assumption which could limit the choice of usable modulation schemes. In other words, any modulation scheme that achieves a constant amplitude signal, such as the GFSK one, may be used. Indeed, a very efficient and robust decoder is hereby provided which is resilient enough to decode GFSK signals in the presence of interference and synchronization errors. Others modulation schemes, such as the one known as OQPSK modulation and the one known as MSK modulation, should also be usable.
From a complexity point of view, a rigorous complexity analysis shows that our algorithm operates in linear time, i.e., O(n), as neither exhaustive searches, nor expensive matrix decompositions (such as EVD, SVD, QR, LU, RRQR, Jordan, Schur, or the like) is required.
The proposed method according to an embodiment also has a very low latency when compared to other near-optimal methods. These are key differentiators compared to the existing advanced GFSK decoder, which are usually based on Viterbi algorithm.
From
We see that the estimator 12 of the decoder 1 according to the second aspect of the invention enjoys good statistical properties, such as unbiasedness, sufficient statistics, variance (and thus MSE) reduction at each bit reception, and density function convergence per estimate. This means that the longer the transmit frame is (in terms of bits/bytes), the more reliable the estimator 12 is going to be.
The foregoing description has provided, by way of exemplary and non-limiting examples, a full and informative description of the decoding method according to the invention. However, various modifications and adaptations may become apparent to those skilled in the relevant arts in view of the foregoing description, when read in conjunction with the accompanying drawings and the appended claims. As but some examples, the use of other similar or equivalent algorithms and data representations may be attempted by those skilled in the art. Further, the various names used for the different elements, variables and functions (e.g. symbol detector, presumed symbol, angle( )) are merely descriptive and are not intended to be read in a limiting sense, as these various elements, variables and functions can be referred to by any suitable names. All such and similar modifications of the teachings of this invention will still fall within the scope of the claims of this invention.
Furthermore, some of the features of the exemplary embodiments of this invention may be used to advantage without the corresponding use of other features. As such, the foregoing description should be considered as merely illustrative of the principles, teachings and embodiments of this invention, and not in limitation thereof.
Number | Date | Country | Kind |
---|---|---|---|
20315405.9 | Sep 2020 | EP | regional |