Interference reduction by step function removal
Correcting a signal offset may include observing a finite duration signal yn that comprises a representation of a mixture of a desired signal and an undesired signal. The undesired signal may include an offset component which may be modeled as comprising a step function u defined by unknown step function parameters. The unknown step function parameters may be estimated using, for example, a maximum likelihood method. Thereafter, yn may be corrected based on the estimated step function parameters.
This application is a continuation application of and claims priority to U.S. patent application Ser. No. 10/040,602, filed Dec. 28, 2001.
TECHNICAL FIELDThis invention relates to reception of a signal.
BACKGROUNDA received signal may include a desired signal from a desired source along with one or more undesired signals, such as, for example, a noise signal (e.g., additive noise such as white Gaussian noise) from a noise source, and/or an interfering signal from an interfering source (e.g., main-lobe or side-lobe energy of the interfering signal). The received signal also may include an offset component such as, for example, a DC (direct current) offset component, that may be undesirable. The offset component is an additional additive term and may be a constant offset such as, for example, a DC offset, or may be a non-constant offset such as, for example, a step function.
To extract the desired signal from the received signal, characteristic parameters (e.g., data bits, frequency offset, DC offset) that model the received signal may be estimated. It may be desirable to perform preprocessing of the received signal prior to estimating the characteristic parameters, such as, for example, estimating the offset and removing its effect. For example, the offset may be estimated as a mean of the received signal and the mean may then be subtracted from the received signal.
The offset of the received signal may vary, for example, because of variation in the interfering signal. Such variations may cause the mean of the received signal to provide a poor estimate of the signal offset. Subtracting a poor estimate of the offset would then bias the estimates of the characteristic parameters and lead to inaccurate results.
DESCRIPTION OF DRAWINGS
Like reference symbols in the various drawings indicate like elements.
DETAILED DESCRIPTIONFor illustrative purposes, a process is described for interference reduction by offset correcting a signal, where the offset may be modeled as including a step function and the signal is corrected by removing the undesired step function. For clarity of exposition, the description generally proceeds from an account of general elements and their high level relationship to a detailed account of illustrative roles, configurations, and components of the elements.
Referring to
The system 100 of
In general, the transmitter 110 and the receiver 130 may include any devices, systems, pieces of code, and/or combinations of these that may be used to transmit or receive, respectively, a waveform z(t) that generally may be represented as
z(t)=Re{s(t)}cos(ω0t)−Im{s(t)}sin(ω0t) (1.0)
In equation (1.0), s(t) may denote a complex signal, ω0=2πf0 may be an associated carrier frequency, and Re{s(t)} and Im{s(t)} denote respectively, real and imaginary parts of s(t).
A transmitter (e.g., transmitter 110) and/or a receiver (e.g., receiver 130) generally may include, for example, a mixer (e.g., mixer 135), a summer, a phase locked loop, a frequency synthesizer, a filter (e.g., filter 137), an oscillator (e.g., local oscillator 133), a frequency divider, a phase modulator, a down converter, an amplifier, a phase shifter, an analog-to-digital (A/D) converter or a digital-to-analog (D/A) converter (e.g., A/D converter 137), a microprocessor (MPU), a digital signal processor (DSP), a computer, or a signal processing circuit, whether linear or nonlinear, analog or digital, and/or any combination of these elements.
More specifically, receiver 130 may include a down-converter for down-converting an input signal from radio frequency (RF) to baseband. The down-converter includes the local oscillator 133, the mixer 135, and the filter 137 (e.g., an infinite impulse response filter, a finite impulse response filter). The receiver 130 also may include an A/D converter to generate a discrete signal from a continuous input and, for performing step parameter estimation and offset correction, any device, system, or piece of code suitable for that task, such as, for example, step parameter estimator and signal offset corrector 139. The step parameter estimator and signal offset corrector 139 may include, for example, a microprocessor control unit (MCU), a digital signal processing (DSP) component, a computer, a piece of code, a signal processing circuit, whether linear or nonlinear, analog or digital, and/or any combination of these for use in performing the step parameter estimation and/or the offset correction, including step function removal.
The transmitter 110 transmits a signal z(t) over the channel 150. The channel 150 may include any medium over which a signal may be communicated, such as, for example, an RF (radio frequency) portion of the electromagnetic spectrum, and or any other portion of the electromagnetic spectrum. Associated with the channel are an interference source 151 that generates an interference signal I (t) and a noise source 153 that generates a noise signal w(t). The noise source 153 and the interference source 151 add noise w(t) and interference I(t), respectively, to z(t) to form a signal r(t) received by the receiver.
The noise w(t) may include, for example, additive white Gaussian noise that may have a zero or non-zero mean, while the interfering signal I(t) may have very different characteristics before and after an event that occurs within the burst. For example, if the interfering source is due to a different TDMA user who is transmitting at the same frequency as, but not time aligned with, the desired user, then the interference may appear as being turned on and off during the burst for multiple bursts.
Note that the signals z(t) and I(t), as shown in
The time slots for these first and second TDMA waveforms are not time aligned with each other (e.g., each time slot of the second TDMA waveform lags (or leads) the corresponding time slot of the first TDMA channel by the same time increment of t2-t1). The interference signal I(t) also may have a power that is much greater than that of z(t) and a center frequency different than the center frequency ω0 of z(t), such as, for example, a center frequency that approximates a harmonic of ω0.
Because of the phase difference between the two TDMA waveforms, the transmission of signal I(t) at time t2 may appear as interference that is turned on and off and is included in signal z(t). Moreover, a TDMA channel structure, such as, for example, a TDMA time-slot assignment methodology, may ensure that z(t) and I(t) transmit in lockstep, causing z(t) to experience burst interference from I(t) beginning at the same relative point in each time-slot in which z(t) is transmitted (e.g., t2-t1 from the beginning of each time slot).
Referring again to
Thereafter, y(t) passes through a low pass or band pass filter and/or an A/D (analog-to-digital) converter 137 (e.g., an integrator that performs the functions of A/D conversion and low pass filtering) to produce a discrete signal yn that may include an undesirable offset component. Thereafter, yn is processed further by step parameter estimator and offset corrector 139, which models the offset as a step function and estimates parameters descriptive of the step function. The offset of yn is corrected by offset corrector 139 based on the estimated step function parameters.
z(t)=Re{s(t)}cos ω0t-Im{s(t)}sin ω0t. (1.1)
Due to the leakage of r(t) into the local oscillator 333, the mixer 335 may not simply multiply r(t) by a sinusoid (e.g.,A0e−jω
y(t)=A0[z(t)+I(t)+w(t)]e−jω
Substituting equation 1.1 for z(t) produces
If the attenuation term γ is sufficiently small compared to the signal amplitude, then y(t) may be approximated as
y(t)≈A0[Re{s(t)}cos ω0t−Im{s(t)}sin ω0t]e−jω
in which the term γI2(t) is retained because it is assumed that I(t) is of substantially greater power than z(t).
The signal y(t) then passes through a low pass filter 339, for example, to produce ylow(t), where ylow(t) may be approximated as:
in which the term A0I(t)e−jω
An A/D converter 341 may be used to generate a discrete signal yn based on the signal ylow(t). Assuming that γIbb2 may be represented as a step function, the discrete signal yn may be represented as:
where sn(θ) is a discrete model of the baseband signal, θ is a vector of unknown signal parameters (e.g., data bits, frequency offset), and wn is a discrete representation of zero-mean additive white Gaussian noise remaining after passing w(t) through the low pass filter 339 and the A/D converter 341. Also, referring now to
Referring again to
The parameter estimator 139 may estimate the step function parameters based on, for example, gradient descent algorithms (e.g., the least-mean-square algorithm, Newton's method, the steepest descent method, and/or any combination of these methods) and/or the maximum-likelihood (ML) method.
The ML method provides a general method of maximizing the likelihood of the joint probability density function of the values of the received signal vector (y0, . . . ,yN-1) given an intended signal vector (x0, . . . ,xN-1). For the case when the observations are independent, a combined probability, or likelihood function, may be expressed as the product of the probability densities of the independent received signal vector samples, i.e., p=p(y0) . . . p(yN-1) where it may be assumed that each probability density can be modeled as a Gaussian density. The likelihood function p is then maximized to find the optimal parameters using any suitable optimization technique (e.g., a non-linear optimization technique), such as, for example, the Nelder-Mead method (a method based upon the simplex algorithm), the steepest descent method, the LMS (least-mean-square) method, the Levenberg-Marquardt method (a least squares approach), the Davidson-Fletcher-Powell method (a quasi-Newton based method), or the Broyden-Fletcher-Goldfarb-Shannon method (a quasi-Newton based method), and/or any combination of one or more of these or other optimization methods.
More specifically, a ML estimate of the step function parameters c1, c2, and α can be obtained from the samples yn as described above. For example, we may take the baseband signal model sn(θ) and noise model w(n) to have a zero mean, since their means can be incorporated into the step function parameters. Using
as an expression of the mean of the individual values of the received signal vector produces the following ML likelihood function of the complex observation:
which may be simplified to
To maximize the value of p, it is sufficient to minimize the value of
which is a nonlinear least squares optimization problem. Specifically, the unknown parameters in equation (1.6) can be determined by solving
To determine the solution of (1.11), it is useful to partition equation (1.11) over a first interval before the transition of the square wave and a second interval after the transition of the square wave. That is, equation (1.11) becomes:
Equation (1.12) may be minimized over (θ, c1, c2, α) jointly using any of the previously mentioned optimization methods. However, since c1 and c2 are in separate terms of the objective function, their estimates also may be solved for separately. For example, the estimate for c1 may be obtained analytically by differentiating the portion of equation (1.12) that corresponds to the first interval with respect to c1, setting the result equal to zero, and solving for c1. The estimate of c2 may be solved by operating upon the portion of equation (1.12) that corresponds to the second interval in like fashion.
The estimates of c1 and c2 also may be obtained qualitatively. For example, the estimate for c1 may be expressed as a mean of an error between the observation yn and the signal prediction sn(θ) before the square wave transitions; similarly, the estimate for c2 may be expressed as a mean of an error between the observation yn and the signal prediction sn(θ) after the square wave transitions. Hence, the estimates ĉ1 of c1 and ĉ2 of c2 may be expressed as
Equations (1.13) and (1.14) then may be substituted back into the objective function of equation (1.12), resulting in the following expression of the objective function:
Now, equation (1.15) is a function of the observation, yn, the unknown signal parameters, θ, and the location of the step function, α. All of these parameters may be jointly estimated, for example, using non-linear optimization techniques as described above.
Nevertheless, it also may be possible to estimate only the unknown parameters c1, c2 and α based on expanding and rearranging the terms of equation (1.15) to give
The first term in equation (1.16) is an expression of mean square error between the observation yn and the signal prediction
while the second term is explicitly provided by equation (1.17).
All of the other terms of equation (1.16) involve averages of the signal prediction
and may be approximated as zero if the expectation of sn(θ) is approximately equal to zero, for both before and after the transition of the step function. When the expectation of sn(θ) may not be approximated as zero, the parameters may be estimated using a method that retains these terms. For example, the parameters may be estimated by starting with a seed value of a that may be used to determine an estimate of θ, which, in turn, may be used to produce an estimate of α. The method may be iterative and may continue to alternate between estimating α and θ until convergence to a desired degree of precision is achieved.
Nevertheless, for many signals, such as, for example, a GSM signal for which the expected value of the underlying binary data stream is zero or approximately zero, it is reasonable to assume that the average of the signal prediction sn(θ) is equal or approximately equal to zero when taken over a sufficiently large interval. For example, the signal prediction may be expressed as:
where dk is an original binary data sequence with an expectation of zero, and hn is the combined action of the transmit filter, the channel filter, and the receive filter. Here the vector of unknown parameters, θ, can be taken as the complete data sequence dk for all k and the complete filter hn for all n. Because the expectation of the binary sequence is zero and the binary sequence is independent of the combined filter, then the expectation of the signal in equation (1.18) is zero. That is,
E{dk}=0 implies E{sn(θ)}=0. (1.19)
Hence, approximating as zero the expectation of sn(θ), the objective function of (1.16) becomes:
and equation (1.20) may be minimized by selecting an α that maximizes g(α). That is,
Next, temporary parameters Yps (a partial sum of the data) and gmax are set initially to zero, and temporary parameter αTest is set initially equal to one (step 520).
Using the parameters of step 520, estimates gmax, {circumflex over (α)}, and Ŷps may be computed iteratively over increasing values of αTest while αTest is less than or equal to N−1, the number of data samples (steps 530). For example, as shown in
(step 535). The updated value of g then may be compared to the stored value of gmax (step 537), and if updated g is greater than gmax, then gmax may be set equal to updated g as a best current guess of the maximum of g, â may be set equal to αTest, and Ŷps may be set equal to Yps (step 539). After updating the values of gmax, {circumflex over (α)}, and Ŷps (step 539), αTest may be incremented (step 541) and, if αTest is less than or equal to N-1 (step 531), then steps 530 may be repeated.
The estimation of the parameters accomplished in steps 530 also may be performed, for example, by decrementing αTest from a high value to a low value, or by performing a random selection of αTest. Under any of the approaches mentioned, parameters may or may not be estimated for each value of αTest.
Following completion of the iterative process of steps 530, the estimated values of gmax, {circumflex over (α)}, and Ŷps may be used to correct the offset of the data yn (step 550). For example, using {circumflex over (α)} as the estimate of the transition point of the step function, the estimate ĉ1 may be expressed using the calculated values as
while ĉ2 may be expressed as
Optionally, where ĉ1 and ĉ2 as estimated above are equal or approximately equal (indicating that a step function may not be present), then both may be re-estimated as
Thereafter, to correct the offset of the received data yn, the estimated parameters may be used to subtract the step function from each data point as follows
Following the correction of the offset, further estimation methods may be applied to the residual data (yn minus the step function) in order to estimate the remaining unknown signal parameters θ.
Other implementations are within the scope of the following claims.
Claims
1. A method comprising:
- observing a finite duration signal yn that comprises a representation of a mixture of a desired signal and an undesired signal, the undesired signal comprising an offset component based on interference of an external interference source;
- modeling the offset component of the undesired signal as comprising a step function u defined by unknown step function parameters;
- estimating the unknown step function parameters; and
- adjusting yn based on the estimated step function parameters.
2. The method of claim 1 in which yn comprises a continuous signal.
3. The method of claim 1 in which yn comprises a discrete signal.
4. The method of claim 3 in which:
- yn includes N samples and comprises a discrete representation of a mixture of the desired signal, the undesired signal, and a second signal including a generally sinusoidal waveform and an attenuated version of the desired signal; and
- yn is modeled as including a discrete representation of the desired signal and a discrete representation of an offset component related to a square of the undesired signal, in which the offset component is modeled as comprising a step function u defined by unknown step function parameters.
5. The method of claim 1 in which the step function parameters include a first parameter c1 indicative of a first amplitude of the step function, a second parameter c2 indicative of a second amplitude of the step function, and a third parameter α indicative of a point at which the step function transitions from the first amplitude to the second amplitude, and in which the desired signal is a function of at least one unknown signal parameter θ.
6. The method of claim 5 in which yn includes N samples and estimating the step function parameters includes jointly estimating θ, c1, c2, and α (0≦α<N) based on a non-linear optimization method.
7. The method of claim 5 in which yn includes N samples and estimating the step function parameters includes estimating c1, c2, and α (0≦α<N) based on a maximum likelihood method.
8. The method of claim 7 in which the estimates of the step function parameters comprise:
- a first estimate ĉ1 of c1 where
- c ^ 1 ≈ 1 α ^ ∑ n = 0 α ^ - 1 y n;
- a second estimate ĉ2 of c2 where
- c ^ 2 ≈ 1 N - α ^ ∑ n = α ^ N - 1 y n;
- and
- a third estimate {circumflex over (α)} of α where
- α ^ ≈ arg max α Test 1 α Test ∑ n = 0 α Test - 1 y n 2 + 1 N - α Test ∑ n = α Test N - 1 y n 2, 0 ≤ α Test < N - 1.
9. The method of claim 8 in which determining {circumflex over (α)} comprises:
- selecting more than one value of αTest;
- determining a value g for each selected value of αTest where
- g ≈ 1 α Test ∑ n = 0 α Test - 1 y n 2 + 1 N - α Test ∑ n = α Test N - 1 y n 2;
- selecting from among the determined values of g one or more maximum values of g; and
- selecting {circumflex over (α)} based on the one or more maximum values of g.
10. The method of claim 9 in which less than N values of αTest are selected.
11. The method of claim 7 in which estimating the step function parameters further comprises jointly estimating θ, c1, c2, and α based on a non-linear minimization of a function comprising f ( θ, c1, c2, α ) ≈ ∑ n = 0 α - 1 y n - 1 α ∑ m = 0 α - 1 y m - A 0 2 s m ( θ ) + 1 α ∑ m = 0 α - 1 A 0 2 s m ( θ ) 2 + ∑ n = α N - 1 y n - 1 N - α ∑ m = α N - α y m - A 0 2 s n ( θ ) + 1 N - α ∑ m = α N - α A 0 2 s m ( θ ) 2
- in which the minimization is performed by computing one or more of the derivatives of f.
12. A system comprising:
- an observation circuit structured and arranged to observe a finite duration signal yn that comprises a discrete representation of a mixture of a desired signal and an undesired signal, the undesired signal comprising an offset component based on interference of an external interference source;
- a modeling circuit structured and arranged to model the offset component of the undesired signal as comprising a step function u defined by unknown step function parameters;
- an estimating circuit structured and arranged to determine estimated step function parameters representative of the unknown step function parameters; and
- a correction circuit structured and arranged to correct yn based on the estimated step function parameters.
13. The system of claim 12 in which yn comprises a continuous signal.
14. The system of claim 12 in which yn comprises a discrete signal.
15. The system of claim 14 in which:
- yn includes N samples and comprises a discrete representation of a mixture of the desired signal, the undesired signal, and a second signal including a generally sinusoidal waveform and an attenuated version of the desired signal; and
- the modeling circuit is further configured to model yn as comprising a discrete representation of the desired signal and also a discrete representation of an offset component related to a square of the undesired signal.
16. The system of claim 12 in which the unknown step function parameters include a first parameter c1 indicative of a first amplitude of the step function, a second parameter c2 indicative of a second amplitude of the step function, and a third parameter α indicative of a point at which the step function transitions from the first amplitude to the second amplitude, and in which the desired signal is a function of at least one unknown signal parameter θ.
17. The system of claim 16 in which yn includes N samples and the estimating circuit is further configured to estimate jointly the unknown step function parameters θ, c1, c2, and α (0≦α<N) based on a non-linear optimization method.
18. The system of claim 16 in which yn includes N samples and the estimating circuit is further configured to estimate the unknown step function parameters c1, c2, and α (0≦α<N) based on a maximum likelihood method.
19. The system of claim 18 in which the estimating circuit is further configured to estimate the unknown step function parameters as comprising:
- a first estimate ĉ1 of c1 where
- c ^ 1 ≈ 1 α ^ ∑ n = 0 α ^ - 1 y n;
- a second estimate ĉ2 of c2 where
- c ^ 2 ≈ 1 N - α ^ ∑ n = α ^ N - 1 y n;
- and
- a third estimate {circumflex over (α)} of α where
- α ^ ≈ arg max α Test 1 α Test ∑ n = 0 α Test - 1 y n 2 + 1 N - α Test ∑ n = α Test N - 1 y n 2, 0 ≤ α Test < N.
20. The system of claim 19 in which the estimating circuit is further configured to determine {circumflex over (α)} based on the following:
- selecting more than one value of αTest;
- determining a value g for each selected value of αTest where
- g ≈ 1 α Test ∑ n = 0 α Test - 1 y n 2 + 1 N - α Test ∑ n = α Test N - 1 y n 2;
- selecting from among the determined values of g one or more maximum values of g; and
- selecting {circumflex over (α)} based on the one or more maximum values of g.
21. The system of claim 20 in which less than N values of αTest are selected by the estimating circuit.
22. The system of claim 18 in which the estimating circuit is further configured to estimate jointly the unknown step function parameters θ, c1, c2, and α based on non-linear minimization of a function comprising f ( θ, c1, c2, α ) ≈ ∑ n = 0 α - 1 y n - 1 α ∑ m = 0 α - 1 y m - A 0 2 s m ( θ ) + 1 α ∑ m = 0 α - 1 A 0 2 s m ( θ ) 2 + ∑ n = α N - 1 y n - 1 N - α ∑ m = α N - α y m - A 0 2 s n ( θ ) + 1 N - α ∑ m = α N - α A 0 2 s m ( θ ) 2 in which minimization is performed by computing one or more of the derivatives of f.
23. A computer program stored on a computer readable medium or a propagated signal, the computer program comprising:
- an observation code segment configured to cause a computer to observe a finite duration signal yn that comprises a representation of a mixture of a desired signal and an undesired signal, the undesired signal comprising an offset component based on interference of an external interference source;
- a modeling code segment configured to cause the computer to model the offset component of the undesired signal as comprising a step function u defined by unknown step function parameters;
- an estimating code segment configured to cause the computer to determine estimated step function parameters representative of the unknown step function parameters; and
- a correcting code segment configured to cause the computer to correct yn based on the estimated step function parameters.
24. The computer program of claim 23 in which yn comprises a continuous signal.
25. The computer program of claim 23 in which yn comprises a discrete signal.
26. The computer program of claim 25 in which:
- yn includes N samples and comprises a discrete representation of a mixture of the desired signal, the undesired signal, and a second signal including a generally sinusoidal waveform and an attenuated version of the desired signal;
- a modeling code segment configured to cause the computer to model yn as comprised of sn, a discrete representation of the desired signal and also a discrete representation of an offset component related to a square of the undesired signal, in which the modeling code segment also is configured to cause the computer to model the offset component as comprising a step function u defined by unknown step function parameters.
27. The computer program of claim 23 in which the unknown step function parameters include a first parameter c1 indicative of a first amplitude of the step function, a second parameter c2 indicative of a second amplitude of the step function, and a third parameter α indicative of a point at which the step function transitions from the first amplitude to the second amplitude, and in which the desired signal is a function of at least one unknown signal parameter θ.
28. The computer program of claim 27 in which yn includes N samples and the estimating code segment further comprises a non-linear optimization code segment configured to cause the computer program to estimate jointly the unknown step function parameters θ, c1, c2, and a (0≦α<N) based on a non-linear optimization method.
29. The computer program of claim 27 in which yn includes N samples and the estimating code segment further comprises a maximum likelihood code segment configured to cause the computer to estimate the unknown step function parameters c1, c2, and a (0≦α<N) based on a maximum likelihood method.
30. The computer program of claim 29 in which the maximum likelihood code segment is further configured to cause the computer to estimate the unknown step function parameters as comprising:
- a first estimate ĉ1 of c1 where
- c ^ 1 ≈ 1 α ^ ∑ n = 0 α ^ - 1 y n;
- a second estimate ĉ2 of c2 where
- c ^ 2 ≈ 1 N - α ^ ∑ n = α ^ N - 1 y n;
- and
- a third estimate {circumflex over (α)} of α where
- α ^ ≈ arg max α Test 1 α Test ∑ n = 0 α Test - 1 y n 2 + 1 N - α Test ∑ n = α Test N - 1 y n 2, 0 ≤ α Test < N.
31. The computer program of claim 30 in which the maximum likelihood code segment further comprises:
- a selecting code segment configured to cause the computer to select more than one value of αTest;
- a calculating code segment configured to cause the computer to determine a value g for each selected value of αTest where
- g ≈ 1 α Test ∑ n = 0 α Test - 1 y n 2 + 1 N - α Test ∑ n = α Test N - 1 y n 2;
- a g_max code segment configured to cause the computer to select from among the determined values of g one or more maximum values of g; and
- an â_max code segment configured to cause the computer to select {circumflex over (α)} based on the one or more maximum values of g.
32. The computer program of claim 31 in which the selecting code segment is further configured to cause the computer to select less than N values of αTest.
33. The computer program of claim 29 in which the maximum likelihood code segment is further configured to cause the computer to estimate jointly the unknown step function parameters θ, c1, c2, and α based on non-linear minimization of a function comprising f ( θ, c1, c2, α ) ≈ ∑ n = 0 α - 1 y n - 1 α ∑ m = 0 α - 1 y m - A 0 2 s m ( θ ) + 1 α ∑ m = 0 α - 1 A 0 2 s m ( θ ) 2 + ∑ n = α N - 1 y n - 1 N - α ∑ m = α N - α y m - A 0 2 s n ( θ ) + 1 N - α ∑ m = α N - α A 0 2 s m ( θ ) 2 in which the minimization is performed by computing one or more of the derivatives of f.
34. A processor which:
- observes a finite duration signal yn that comprises a representation of a mixture of a desired signal and an undesired signal, the undesired signal comprising an offset component based on interference of an external interference source;
- models the offset component of the undesired signal as a step function u defined by unknown step function parameters;
- determines estimated step function parameters; and
- corrects the signal yn based on the estimated step function parameters.
35. The processor of claim 34 in which yn comprises a continuous signal.
36. The processor of claim 34 in which yn comprises a discrete signal.
37. The processor of claim 36 in which:
- yn includes N samples and comprises a discrete representation of a mixture of the desired signal, the undesired signal, and a second signal including a generally sinusoidal waveform and an attenuated version of the desired signal; and
- yn is modeled as including a discrete representation of the desired signal and also a discrete representation of an offset component related to a square of the undesired signal, and models the offset component as a step function u defined by unknown step function parameters.
38. The processor of claim 34 in which yn includes N samples and the unknown step function parameters include a first parameter c1 indicative of a first amplitude of the step function, a second parameter c2 indicative of a second amplitude of the step function, and a third parameter α (0≦α<N) indicative of a point at which the step function transitions from the first amplitude to the second amplitude.
39. The processor of claim 38 in which the processor estimates the unknown step function parameters as comprising:
- a first estimate ĉ1 of c1 where
- c ^ 1 ≈ 1 α ^ ∑ n = 0 α ^ - 1 y n;
- a second estimate ĉ2 of c2 where
- c ^ 2 ≈ 1 N - α ^ ∑ n = α ^ N - 1 y n;
- and
- a third estimate {circumflex over (α)} of α where
- α ^ ≈ arg max α Test 1 α Test ∑ n = 0 α Test - 1 y n + 1 N - α Test ∑ n = α Test N - 1 y n 2.
40. The method of claim 1 wherein the desired signal comprises data of interest.
41. The system of claim 12 wherein the desired signal comprises data of interest.
42. The computer program of claim 23 wherein the desired signal comprises data of interest.
43. The processor of claim 34 wherein the desired signal comprises data of interest.
Type: Application
Filed: Oct 4, 2004
Publication Date: Feb 24, 2005
Inventors: Stuart Golden (San Diego, CA), Naiel Askar (San Diego, CA)
Application Number: 10/958,473