1. Field of the Invention
The present invention relates to communication systems and, more particularly, to channel estimation in communication systems such as orthogonal frequency domain multiplexing or other systems that rely on channel estimation.
2. Description of the Related Art
Orthogonal frequency domain multiplexing (OFDM) is a common modulation strategy for a variety of commercially significant systems, including for digital subscriber line (DSL) communication systems and a number of implementations of the various IEEE 802.xx standards for wireless communication systems. Often, an OFDM receiver will perform one or more functions that require channel estimation to allow the receiver to acquire a signal and to improve signal quality before the receiver begins extracting bits.
OFDM receivers generally need to obtain signal timing information from a received signal to help identify the start of a symbol within the received signal. A symbol is a predetermined number Nb of bits uniquely mapped into a waveform over a predetermined, finite interval or duration. Each possible collection of bits is mapped to a unique signal according to the mapping or modulation strategy dictated by the OFDM scheme. Once an OFDM receiver determines when a symbol begins within the received signal, the receiver performs additional processing to improve the quality of the received signal. In the processing to improve signal quality, the receiver attempts to achieve a target bit error rate (BER), often by implementing a linear filter, or equalizer, to condition the input signal. The received signal can be significantly distorted by channel imperfections. Ideally, the equalizer corrects the distortions introduced by the channel completely so that the receiver can demodulate the signal with performance limited only by the noise level.
OFDM, unlike most other modulation strategies commonly used in communication systems, can include two equalizers to improve signal quality: a time equalizer (TEQ) and a frequency equalizer (FEQ). Some OFDM applications such as DSL include a time equalizer while others, such as systems that implement current wireless standards, do not demand a time equalizer. All practical OFDM receivers have a frequency equalizer. Whether a receiver includes a time equalizer or only a frequency equalizer, the receiver needs to perform channel estimation to at least initially determine values of the equalizer coefficients before the equalizer can be used to improve the signal quality. Determining the coefficients for frequency equalizers is typically performed in the frequency domain.
Conventional OFDM receiver circuitry down converts the received signal to baseband and then analog-to-digital converts that signal to produce the information signal s(n) that is input into the OFDM processing circuitry shown in
The parallel data output from the element 1120 is provided to a fast Fourier transform (FFT) processor 1130 that converts the time domain samples s(n) to a set of frequency domain samples Ri(k) for processing. The received OFDM signals are assumed to be corrupted by the channel, which is assumed for OFDM to introduce amplitude and phase distortion to the samples from each of the frequencies used in the OFDM system. The FEQ 1150 applies an amplitude and phase correction specific to each of the frequencies used in the OFDM system to the various samples transmitted on the different frequencies. To determine the correction to be applied by the FEQ 1150, the FEQ 1150 needs an estimate of the channel's amplitude and phase variations from ideal at each frequency. In
A conventional OFDM channel estimator 1140 used in
In many applications, there is a requirement to model an unknown system or process with a transfer function. The transfer function takes the form of either an infinite impulse response (IIR) or a finite impulse response (FIR) polynomial or filter. The former is also referred to as an auto-regressive moving average (ARMA) model and the latter simply as a moving average (MA) model.
The process of system identification or, equivalently, characterization, can typically be described as shown in
Therefore, if the samples of the input signal s 101 are known and the unknown system's output signal y 112 samples are measured, the linear estimation of the unknown system can be achieved though various strategies.
The signals s 101 and y 102 are better described in a sampled system by adding the sampling index n which maps the value of each signal sample to an interval of time. The modeled unknown system response h[l] has the same sampling interval as the signals s[n] and y[n]. The discussions here assume that input and output signals are sampled at the same sampling interval. Variations on these assumptions do not affect performance of presently preferred implementations of the present invention.
The simplest strategy to identify an unknown system is to use an input signal for system identification that is s[0]=1, s[n]=0 for values of n≠0, and ranging between −∞ and +∞. This impulse response is termed a Dirac delta function and it has the desired effect in equation (1) of y[n]=h[n]. However, in most practical systems, using a Dirac delta function for system identification is not possible due to the practical difficulty in generating such an input signal, combined with hindering operational conditions such as the typical throughput rates in communication systems.
Since the right side of equation (1) is a dot-product definition, the output 112 is observed over N samples and the MA time span of h[l] is assumed to not be significant beyond L samples, then a matrix formulation of equation (1) is readily obtained:
y=Hs=Sh (2)
where the N-by-L matrix H(S) has rows with the time-shifted samples, as a function of n, and the vector L-by-1 s(h) is fixed over the time span in y. That is, the entries in the vector y are
y[m]=[y[n]y[n+1] . . . y[n+N+1]]T (3).
The time index m is used to denote the possibility that the time-series of the vector y may not have a one-to-one correspondence with the input samples y. On the other hand, the index m in an OFDM system does have a one-to-one correspondence with the received OFDM symbol, defined as the time interval containing N=FFT length+cycle prefix samples. For example, in the WiMAX standard, this value can be N=1024+128=1152 samples.
Linear algebra notation is used to describe the operations due to its succinct representation and due to its immediate parallel to a hardware multiply-and-accumulate operation that performs a dot-product between two vectors, or the multiplication of a matrix row and a vector, as in equation (2). Those skilled in the art generally also exploit symmetric properties in the matrix to reduce complexity in this matrix-vector multiplication.
An aspect of the present invention provides a receiver, comprising a reference signal generator that generates a time domain reference signal responsive to a received frequency domain pilot signal. The receiver includes a channel estimator responsive to the time domain reference signal and generating a time domain channel estimate.
Another aspect of the present invention provides a receiver, comprising a reference signal generator that generates a local reference signal responsive to a received frequency domain pilot signal extracted from an input signal. The receiver includes a channel estimator responsive to the local reference signal and the input signal. The channel estimator generates an initial channel estimate from a cross-correlation based on the local reference signal and the input signal. A correction module generates a channel correction to the initial channel estimate. The correction module is responsive to the initial channel estimate to generate a set of basis filters and to generate the channel correction as a combination of the set of basis filters and a set of coordinates defined in the set of basis filters. A channel module adds the initial channel estimate with the channel correction and generates a further channel estimate.
Still another aspect of the present invention provides a frequency domain receiver for a communications system, the receiver comprising a reference signal generator that generates a time domain local reference signal. A channel estimator responsive to the local reference signal and the input signal generates a time domain initial channel estimate from a cross-correlation based on the local reference signal and an input signal. A correction module generates a channel correction to the initial channel estimate. The correction module responsive to the initial channel estimate to generate a set of basis vectors and to generate the channel correction as a combination of the set of basis vectors and a set of coordinates defined in the set of basis vectors. A channel module that adds the initial channel estimate with the channel correction and generates a time domain further channel estimate, wherein the further channel estimate is a minimum error channel estimate in a least squares sense. A filter module that generates a signal filter based on the further channel estimate and filters the input signal.
Aspects of the present invention are illustrated in the attached drawings and can be better understood by reference to those drawings in conjunction with the detailed description. The attached drawings form a part of the disclosure.
A preferred aspect of the present invention provides a channel estimate for use in either a frequency domain equalizer or in a time domain equalizer. Preferably channel estimation is accomplished by generating an initial channel estimate. For example, a channel estimator may generate an initial channel estimate from a cross correlation between a locally generated reference signal and a received signal input to the receiver. Preferably the channel estimator generates at least one successive channel estimate by determining a correction to the initial channel estimate where the correction is made by vector addition to the initial channel estimate. The at least one successive channel estimate preferably reduces the minimum mean square error of the estimate with respect to a received signal.
In particularly preferred implementations, the successive channel estimate is determined by generating a set of basis vectors, separately generating a set of coordinates with reference to that set of basis vectors, combining the set of basis vectors and the set of coordinates to generate a channel correction vector and adding the channel correction vector to the initial channel estimate to generate the successive channel estimate.
Another aspect of the present invention provides a communication system that generates a channel estimate in the time domain. Preferred implementations of this aspect estimate one or more channels in the time domain using a locally generated reference signal. The channel estimator generates an initial estimate from a cross correlation between the time domain reference signal and an input signal input to the receiver and generates at least one successive channel estimate. Preferably, at least one successive channel estimate reduces the minimum mean square error of the estimate with respect to a received signal. This time domain channel estimation strategy is implemented advantageously with respect to various communication systems including, for example, OFDM systems such as WiMAX systems.
The fundamental problem of channel estimation for a communication system is shown
Using statistical signal analysis, the relationship between the sampled input s[n] and the sampled output y[n] from a given filter h[l] is
where, for the signals typical of communication systems,
r
s
[d]=E{s*[d]s[n+d]}
r
sy
[d]=E{s[d]y*[n+d]} (5).
Equation (5) indicates that the unknown system's impulse response can be obtained from the cross-correlation rsy[d] between the input signal s[n] and the output signal y[n]. If rs[d] is ideally a “spike” consisting of a 1 at the delay d=0 and zero for d≠0, rs[0]=1 and zero otherwise (that is, an ideal Dirac delta function), the cross-correlation between the unknown system output y[n] and the input s[n] reveals the impulse response h[l] for the values of n=d. Define g[l] as follows,
as the output of the modeling module 120 used to approximate h[l]. Preferred aspects of the present invention can be used to provide a best constrained estimate of h[l] given g[l], regardless of how rs[d] differs from a Dirac delta function.
Equation (4) illustrates an approach to identify the unknown system's 110 impulse response. Under most practical circumstances, the auto-correlation rs[d] does not have the ideal Dirac delta function property of being one at a delay of zero and zero otherwise. In fact, the auto-correlation may be unknown a priori or the auto correlation may change with time. As a result, the determined cross-correlation g[l] is not the unknown system's impulse response, but instead g[l] is distorted by the non-ideal auto-correlation rs[d] from the input signal as it is convolved with the system's impulse response.
The accuracy demanded in the unknown system's impulse response estimation is a function of the process that follows to alter the signal y 112. The process may be as simple as a filter f[k]. Although the filter f[k] can take on many forms, depending on the application, in communication systems the filter f[k] is used to “clean up” the communication channel output y[n] 112 to obtain a “best” estimate of the channel input s[n] 101. An example of a preferred implementation environment, which is useful for illustrating aspects of the present invention, is determining the equalizers f[k] for an OFDM communication system. Modern communication systems employing OFDM to achieve high bit rates estimate the channel for each OFDM symbol interval. The channel estimate should be robust and sufficiently accurate, but also should be sufficiently computationally simple to allow the channel to be estimated in a small interval of time.
Preferred embodiments of the present invention can be used to provide time-domain channel estimation through sub-space computations of the transmit signal's 101 statistics. A particularly advantageous strategy for time-domain channel estimation is identified here as least squares channel estimation (LS-CE).
LS-CE can provide an impulse response estimate g[l] 122 that minimizes the error in h[l] 110 due to rsy[d] (in equation (4)) in the least squares sense, by removing at least some of the undesired imperfections in rs[d] due to its deviation from the Dirac delta function. Generally speaking, this LS-CE approximation of the impulse response estimates a correction to be applied to rys[d],
g[l]=r
ys
[l]−G(l,{circumflex over (r)}sy[l],{circumflex over (r)}s[l]) (7),
for 1=0, 1, 2 . . . , L−1. That is, a linear function G(·) of the cross-correlation and auto-correlation estimates is used to subtract the imperfections introduced by rs[d]. This approach is stable and of greatly reduced complexity as compared to a de-convolution of rys[k]. Statistics related to the unknown system are not required. Further features of the formulation in equation (4) include the limited “support” needed for the values of l in the time span of interest.
Determining the linear function G(·) uses a formulation, in linear algebra terms, that generates a subspace basis from a vector consisting of the values in rys[l], followed by a decomposition of the auto-covariance matrix with entries from {circumflex over (r)}s[l]. Therefore, for L significant coefficients in h[l], the estimate g[l] is
g=r
sy
−Gb (8)
where {g, rys} are L-by-1 vectors and G is a L-by-D matrix of columns generated from the vector, but not including rys. The D-by-1 vector b is derived from the auto-covariance matrix Rss, whose entries are given by the transmit signal's auto-correlation function and G preferably is determined through a least-squares formulation. D is termed the approximation index, as is explained below.
Any practical OFDM communication system must be capable of operating in a mobile environment. As such, the equalization process of the received signal should be capable of removing time varying channel distortions and should provide a channel estimate for each received OFDM symbol. The wireless communication standards aid in this channel estimation. In this particular system identification application, the channel constitutes the unknown system 110, and corrections to the received signal must be effected by a filter applied to the unknown system output 112. Another common aspect of currently available mobile or fixed location OFDM modems is the number of antennas and transmission schemes used to exploit the number of antennas at the transmitter and receiver. The added antennas increase the system's sensitivity to channel estimation errors and increase the necessary estimation accuracy.
The simplest transmission scheme is one with a single transmit and receive antenna, as shown in
The equalizer f[n] in an OFDM communication system is calculated for each symbol to establish a high-throughput link. The equalizer's ability to remove distortions depends on the channel estimation accuracy and the effective noise floor in the measurements. Obtaining an accurate estimate of the channel's reflective path delays and amplitude variations is important to achieving higher throughput rates. Higher throughput rates in OFDM are achieved in part by modulating the bits according to modulation schemes that are highly sensitive to channel distortions and noise. Such sensitive modulation schemes especially benefit from an equalizer that is more precise in its ability to remove channel distortions. From another perspective, use of a sensitive modulation scheme places a minimum requirement for accuracy in channel estimation.
Applying equation (6) to an OFDM system can be ineffective because of the auto-correlation properties of the transmitted symbol. The values of rs[d] in equation (5) for d≠0 are not sufficiently suppressed to allow sensitive modulation schemes, which could allow a higher throughput, to be implemented. In severe channels, it is possible that no successful link will be established between two terminals if the channel estimate is done with equation (6) without further corrections.
OFDM offers, under certain assumptions about channel characteristics, the ability to calculate and apply the filter in the frequency domain, which does not require the formulation in equation (4) to estimate the channel. This particular equalizer is termed the frequency equalizer (FEQ), and it is always required in an OFDM receiver, though its efficiency is compromised when the channel assumptions are violated.
Under practical conditions, OFDM systems may advantageously incorporate a time-domain channel estimate, even when the OFDM receiver incorporates only an FEQ. The number of parameters to estimate in the time domain channel estimation is smaller compared to the number of coefficients to determine for the FEQ. For example, in the WiMAX standard, the channel is assumed to not exceed 128 coefficients, but the OFDM symbol has 840 active carriers so that the number of parameters to estimate is reduced by a factor of seven in the time domain. Furthermore, estimation in the time domain is not affected by the loss of orthogonality that can occur through the fast Fourier transfer (FFT) transformation due to imperfections in the channels (e.g., carrier offset) that cause inter-carrier interference (ICI). Therefore, these properties of time-domain channel impulse response (CIR) estimation provide a robust basis for estimating the channel.
The filter 330 and smart antenna 350 conditioning on the input signals achieve their best performance as a function of the channel estimation accuracy. The present invention offers high accuracy at low complexity by estimating the channel in the LS-CE module 320, which processes each input signal available (e.g., 311 and 312) to output channel estimates 322 for equalization, and additional cross terms 324 for improved smart antenna combining 350 and greater fidelity in the estimate 351 of the input signal 301. The reference signals 341 are devised in accordance with the LS-CE processing requirements, derived from existing reference signals embedded in OFDM symbols as specified in standards, for example.
The other alternative multiple-antenna configuration possible in an OFDM receiver is the MIMO receiver 440 in
Unlike the condition in the smart antenna receiver 340, the MIMO combiner 450 extracts plural signals (451 and 452) sent simultaneously by the transmitter. This is the principal appeal of a MIMO system, which increases the throughput as compared to the same link coupled to a SISO receiver 240.
The performance of filter 430 and MIMO 450 conditioning on the input signals is a function of the channel estimation accuracy. Receivers according to some aspects of the invention can be implemented so as to offer such high accuracy at low complexity by estimating the channel in the LS-CE module 420. Preferred implementations of the LS-CE module 420 process each available input signal (e.g., 411 and 412) to output channel estimates 322 for equalization and additional cross terms 424 for improved MIMO combining 450 and greater fidelity in the estimate 451 of the input signals 401 and 402. The reference signals 441 preferably are devised in accordance with the LS-CE processing requirements for MIMO receivers, derived from existing reference signals embedded in OFDM symbols as specified in standards, for example.
To use an LS-CE to estimate the unknown channel(s), two input signals are required, including a reference signal. In the case of OFDM signals, and in particular drawing from the WiMAX (IEEE 802.16) standard, the reference signal is derived from training signals embedded in the transmitted symbols.
An OFDM symbol includes a number of samples related to the size of the fast Fourier transform (FFT) the OFDM modulator uses to generate the time-waveform. The OFDM symbol also includes a pre-determined number of samples from the beginning of the symbol that are copied and appended to the end of the symbol. These copied samples are termed the cycle prefix. The symbol rate is the inverse of the duration of the totality of the OFDM symbol and the cycle prefix samples. In the WiMAX system, symbols are grouped in time to form a frame. This is demonstrated in
Each OFDM symbol transmitted within a frame has a function and a structure according to the information it carries. The first symbol contains no user information or data. The entire first symbol consists of a predetermined number of carriers, each modulated with an a priori known value. This kind of symbol is often referred to as a pilot symbol 510, because the symbol can be replicated perfectly at the receiver for comparison. Additional symbols are then transmitted that contain information for configuration of the network for all users in the network. These symbols are often termed control symbols 540. The remaining symbols are configured to simultaneously include the information or data (data modulated subchannels 520) transmitted to each user and the additional pilot subchannels 530.
An OFDM symbol's time domain samples derive from a plurality of modulated carrier signals in the frequency domain, which are then grouped together into a singular time domain waveform through addition. This addition is effectively computed with an inverse fast Fourier transform (FFT). Then, the standard provides a systematic assignment of a subset of the active carriers, each carrier also termed a subchannel, to be modulated with a known set of carrier amplitude and phase rotations. These are the pilot subchannels. The standard may dictate that these subchannels need not be contiguous. The information bits to be transmitted to a user are likewise mapped into amplitude and phase rotations according to the specifications in the standard.
The user symbols containing the information bits can be sent simultaneously with the training pilot subchannels (known a priori at the receiver). If the channel conditions do not cause a loss of assumed properties about the OFDM symbol, the received symbol will have no significant interference between the pilot and data subchannels. Therefore, the receiver can systematically extract the pilot subchannels and compare the pilot symbols to their ideal state and use the observed errors to devise a frequency domain channel estimate.
Preferred embodiments of the present invention use the pilot subchannels differently, in that the channel estimation preferably is accomplished in the time domain. In the time domain, the OFDM symbol has a plurality of data and pilot subchannels added together into a short-duration waveform, and thus, the receiver does not have an a priori waveform that can be generated at the receiver for a local reference (e.g., 241, 341 and 441). The separation of these data and pilot subchannels is readily accomplished in the frequency domain as is illustrated in
Aspects of the present invention preferably locally generate and use a reference waveform generated to have the symbol structure of a desired signal. For example, the reference waveform may be generated to have the form of an OFDM frame, as shown in
The minimum mean square error (MMSE) formulation for the time-domain channel estimation (TDCE) in WiMAX uses a linear channel model, such that,
y=Hx+n (9),
where x is the transmitted signal, n is the noise vector and y is the received signal vector. The matrix H is the channel convolution matrix. The MMSE estimation for the transmit signal x is given by,
{circumflex over (x)}=R
yx
R
yy
−1
y (10),
where Rxy is the cross-correlation between input and output variables x and y. Note that the specific node at which the received signal y is identified with respect to the receiver circuitry is somewhat arbitrary and can be selected so that it does not impact on the analysis discussed here. Even when applied in the frequency domain, the formulation is rather complex:
Ĥ
MMSE
=R
HH
(RHH
where X is a diagonal matrix with the transmit signal's spectrum (FFT(x)),
Ĥ
LS
=X
−1
Y (12),
and Y is a diagonal matrix with the spectrum for the received signal obtained, for example, from a fast Fourier transform (FFT) of the received signal. Hp is the channel frequency response (CFR) for the pilot subcarriers. Use of singular value decomposition can reduce the complexity of this operation.
A simple method to estimate channels is via the cross-correlation of a locally generated and conjugated reference signal with the signal received at the input of the receiver. This cross-correlation will find the “copies” of the reference signal in the received signal at the delays of the channel. On the other hand, the underlying condition for this cross-correlation to work is that the auto-correlation property of the sequence is (practically) a single spike when aligned, and nearly zero elsewhere. This is the case for most pseudonoise (PN) sequences used in spread spectrum communications and generally sufficiently true for CDMA cellular systems. In contrast, OFDM does not have such a property.
A particularly preferred approach for an OFDM system is to cross-correlate a conjugated locally-generated reference signal with the signal received from the channel (which can be designated the input to the receiver) and to use that cross-correlation result as an initial estimate of the channel. This approach then revises the channel estimate from this initial channel estimate over D steps. Starting with a noiseless case, the linear model from equation (12) states the relationship of the transmitted symbol and the channel and can be equivalently stated as,
y=Hx=Sh (13)
where S is the matrix with the values of x as a convolution matrix. The vector y is the received OFDM symbol.
A fundamental assumption for the least squares (LS) channel estimation strategy is that starting with an initial estimate, such as h1, the receiver can make an estimate that converges toward the ideal channel h. The second assumption is that a step from D to D+1≦Dstop does not increase the MMSE on the estimation error to the true channel, for some Dstop≦L, where L denotes the channel length. This assumption informs the idea of repeated revisions on the original estimate and subsequent modifications.
Based on these assumptions,
y=Sh≅S(h1+GDb) (14)
where GD is termed the D-step revision matrix, or the revision matrix at approximation index D. The initial guess (initial channel estimate) h1 is preferably determined to minimize complexity. The revision matrix is of dimension L×D, and the coordinate vector b is D×1. Then, the following equivalences to equation (14) are apparent,
S
H
ŷ=S
H
S(h1+GDb)={circumflex over (R)}SS(h1+GDb) (15)
G
D
H
S
H
ŷ=G
D
H
{circumflex over (R)}
SS
h
1
+G
D
H
{circumflex over (R)}
SS
G
D
b (16)
and noting that y−ŷ=eD is the error on the revision matrix GD, then
G
D
H
S
H
y+G
D
H
S
H
e
D
=G
D
H
{circumflex over (R)}
SS
h
1
+G
D
H
{circumflex over (R)}
SS
G
D
b (17).
Choosing D for GDHSHeD to be sufficiently small gives
G
D
H
S
H
y=G
D
H
{circumflex over (R)}
SS
h
1
+G
D
H
{circumflex over (R)}
SS
G
D
b (18)
where SHy is a cross-correlation of the received signal with the conjugate of the reference signal. As discussed in greater detail below, the computational complexity can be further reduced by defining h1 (the initial guess) to be this cross-correlation.
Equation (15) has two unknown variables: the revision matrix GD and the coordinates for the revision matrix. A suitable approach to generate the revision matrix GD is to use an initial guess vector h1 and the Lanczos strategy, or the Arnoldi strategy if {circumflex over (R)}SS is not Hermitian. Either strategy computes GD given a seed vector h1 so that,
G
D
H
h
1=0 (19).
That is, GD is determined to be orthogonal to the initial guess vector h1 and preferably provides a basis that spans the space to project the initial guess vector to the desired correction vector. Preferred implementations then continue to solve for the coordinates that provide the improved channel estimate hD with h1=SHy as an initial condition seed vector:
−GDH{circumflex over (R)}SSh1=GDH{circumflex over (R)}SSGDb (20)
b=−(GDH{circumflex over (R)}SSGD)−1GDH{circumflex over (R)}SSh1=−TD−1GDH{circumflex over (R)}SSh1 (21)
and then,
h
D
=h
1
+G
D
b (22)
is the channel estimate.
The Lanczos strategy, which is presently a particularly preferred strategy to obtain GD, has a “self-stop” feature, in that it ceases to generate orthogonal basis vectors (the columns of GD) once an eigenvector is found. This is the designed or intended outcome for the Lanczos and Arnoldi strategies.
If {circumflex over (R)}SS is a diagonal matrix, then the strategies stop with the cross-correlation estimate h1. This is because any vector is an eigenvector to an identity matrix. However, this is why h1 preferably is defined to be the cross-correlation vector h1≡SHy, which is the perfect channel estimate for an uncorrelated signal x (e.g., x is white Gaussian noise). Therefore, the only condition under which {circumflex over (R)}SS is a scaled identity matrix is when the signal x is white Gaussian noise or a pseudonoise sequence with zero-valued auto-correlation outside the zero-delay lag.
When {circumflex over (R)}SS is an identity matrix, it commutes with any matrix and the following conditions hold:
b=−T
D
−1
G
D
H
{circumflex over (R)}
SS
h
1
=−T
D
−1
{circumflex over (R)}
SS
G
D
H
h
1
=−T
D
−1
{circumflex over (R)}
SS0=0 (17).
hence
h
D
=h
1
+G
D
b=h
1 (24).
Another observation relates to the “richness” of {circumflex over (R)}SS. If the transmitted signal has poor auto-correlation properties, then the value of D that results in a target estimation error power ξ=eDHeD, will be lower than one with good auto-correlation properties.
Preferred implementations of the present invention preferably implement an LS-CE in one of two ways, depending on the statistical properties of the OFDM signal characteristics for a given standard. One preferable implementation is termed the “deterministic LS-CE” to denote that the locally generated reference signal (e.g., 241, 341 or 441) is a locally generated signal with the construction illustrated in
The locally generated reference signal from
The basis filter module 730 determines D basis filters, where D is a fixed parameter determined based on performance goals and simulation verifications, preferably using the Lanczos method. Under most known circumstances, the value of D will be somewhere between three and five. Preferably, the matrix G 732 then consists of D columns corresponding to basis filters determined through the Lanczos method.
The gain in the LS-CE is used to reduce the dimension of the received signal's auto-covariance matrix. This reduction in dimension is achieved with the matrix G 732. The dimension reduction module 740 performs this dimensionality reduction by taking the correlation matrix with the reference signal S 703, which is N×L, and produces two matrix outputs: PS, a D×L matrix, and TSS, a D×D matrix. The hardware generates these outputs through the following definitions:
P
S
=G
H
S
H
S (25)
and
T
ss
=P
S
G (26).
Preferably the order of multiplication in equation (25) is selected to minimize the number of MACs required. As discussed above, N is the length of the vector y 701, which is determined by the length of the OFDM symbol, which the WiMAX standard 802.16e specifies as N=1024. Thus, typically, D<<L<<N.
Determining the coordinates b in equation (21) uses two parallel operations. The first operation inverts TSS, which is simpler to perform than the N×N matrix inversions in equations (10) and (11). The second operation projects the initial channel estimate h1 722 to a lower dimension space, using an operation defined as,
h
S
=P
S
h
1 (27)
which is a D×1 vector. The operation of equation (27) is performed in the initial estimate projection module 750, which generates output hS 752. The coordinates b are determined by
b=−T
SS
−1
h
S (28)
in the coordinates calculation module 770, from the inputs TSS−1 762 and hS 752.
The final operation is performed by the channel calculation module 780, which corrects the imperfections in the computation of h1 to provide the improved channel estimate g 782. This operation is simply,
g=h
1
+Gb (29).
Preferably, the hardware is selected through the arrangement and the use of MACs and signal paths so that the estimate g 782 is determined within an OFDM symbol duration, that is, over N sample clock cycles.
As the inputs to the dimension reduction module 840 are different than in its counterpart 740 in
P
S
=G
H
R
SS (30)
and equation (30) remains as
T
ss
=P
S
G (31)
and these equations are implemented in the circuitry of dimension reduction module 840. The simplification savings stem from assuming that RSS 805 is a constant matrix for all OFDM symbols input over time.
This assumption about the auto-covariance matrix RSS is based on the following observation. Depending on how the LS-CE is implemented for a particular OFDM system, the design of the reference signal S (803 or 703) may produce the condition that,
{circumflex over (R)}
SS
=S
H
S≈R
SS (32).
The implication here is that the instantaneous auto-covariance matrix {circumflex over (R)}SS, which can be calculated at every symbol, may not vary much from the long-term average. That is, RSS is the average of {circumflex over (R)}SS over all time. Thus, for certain types of OFDM symbols, regardless of the data present in the modulated carriers, the value of {circumflex over (R)}SS does not vary significantly from RSS.
The simplification achieved by implementing equation (30) rather than equation (25) allows a hardware or software engineer to implement a simpler design according to aspects of the present invention. The LS-CE in
The plot in
The inclusion of the LS-CE into a WiMAX simulator further demonstrated the performance gains that can be obtained through implementation of the LS-CE. The WiMAX simulator used, Agilent Advanced Design System (ADS), performs better than implementable systems because the ADS knows some key parameters to compute the system's frequency equalizer (FEQ) for each received symbol.
WiMAX allows for six different data rates to be transmitted on the downlink, and
Communication between a tower and a user may not achieve the best possible bit rate due to interference from adjacent towers and other sources. Therefore, interference cancellation, or at least some form of mitigation, preferably is added to the receiver, since the simplest OFDM receiver does not provide inherent interference mitigation, let alone cancellation, capabilities.
The simple OFDM receiver in
Several aspects of the present invention are implemented in a preferred OFDM receiver, illustrated schematically in
In any cell network deployment, signals from a plurality of base stations may reach a user with significant power. Preferred implementations of the present invention readily provide for interference mitigation, or cancellation, in OFDM systems by avoiding the use of channel estimation in the frequency domain. The level of interference suppression for an OFDM communication system and hence, the scale of the complexity added to the generic receiver, is preferably selected to achieve the target receiver operating characteristics in the presence of expected multipath and interference.
To mitigate interference, preferred embodiments of the present invention preferably estimate each channel for each interferer. For the example shown in
An interference mitigation module 1280 performs operations to mitigate a single channel. Module 1280 offers the target suppression level for the base station causing the interference, while maximizing the desired base station's power. A plurality of approaches to such computations with varying degrees of performance is known in the art. A preferred embodiment of the interference mitigation module 1280 performs a simple transformation on the desired base station 1201 channel estimate 1232 to include a component of the interfering base station 1202 channel estimate 1242 for cancellation. A generalization of such a scheme relies on a linear mapping, performed through a matrix multiplication, between the channel estimates 1232 and 1242 to a single channel estimate, which is then transformed to the frequency domain by an appropriate FFT operation inside the module 1280. The module 1280 provides frequency domain coefficients 1282 to the FEQ 1290.
Certain preferred embodiments preferably perform a linear transformation between the plurality of channel estimates to a single channel estimate,
is the stacking of the channel estimates in the general case, and shown in equation (37) for two channel estimates. The matrix A is the linear combination matrix which maps from the multiple channel estimates to a single channel estimate c. An example of such a matrix may be,
A=[1−g] (39)
where g is a complex value determined for each iteration of the channel estimation process 1230 and 1240. The variable g may be a magnitude scaling of for example,
g
max
=c
1
H
c
2 (40).
A maximum interference mitigation is achieved when g=gmax, but if the similarity between the channels is high, then the desired base station power may be insufficiently small following interference mitigation. Applying the linear transformation in equation (36), with g=gmax, provides
c
H
c
1
=c
1
H
c
1
−g
max
c
2
H
c
1
=c
1
H
c
1
−|g
max|2 (41)
and,
c
H
c
2
=c
1
H
c
2
−g
max
c
2
H
c
2
=g
max(1−c2Hc2) (42).
The interference mitigation offered by equations (36)-(39) and implemented in module 1280 offers a desirable level of performance for the condition of “channel diversity.” This assumes that the similarity between the channels for each corresponding base station is not high. If channel similarities are high, as in the case of flat rural areas, then more robust operations preferably are implemented in module 1280. The described process provides desirable performance advantages for many practical implementations.
Any interference mitigation or cancellation scheme performance relies on the channel estimation accuracy. The
The present invention has been described in terms of certain preferred embodiments. Those of ordinary skill in the art will appreciate that various modifications and alterations could be made to the specific preferred embodiments described here without varying from the teachings of the present invention. Consequently, the present invention is not intended to be limited to the specific preferred embodiments described here but instead the present invention is to be defined by the appended claims.
This application is a continuation of U.S. application Ser. No. 12/365,805, filed Feb. 4, 2009, entitled, “Least Squares Channel Identification for OFDM Systems,” which is incorporated by reference in its entirety.