Can anyone help me in understanding of deconvolution based on toeplitz matrix?

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Junjie Zhao
Junjie Zhao el 25 de Sept. de 2024
Comentada: William Rose el 7 de Nov. de 2024 a las 3:20
First of all, d is a trace whose size is (1,2500), p is a trace whose size is (1,2500).
For d*w=p, which is Dw=p, where D is Toeplitz matrix made by d. Take d and p as an example [1 2 3 4 5].
I construct D that the first column is [1 2 3 4 5 0 0 0 0], the first row is [1 0 0 0 0], which means d lags 2 time step up and 2 time step down, the 0 time lag is place 3 when the first place is 1.
To find w, I use deconvolution, therefore, w=((D^T)D)^(-1)(D^T)p
Confusion comes in here. the number of row of D is 9, however, the p is (1,5) size, how should I concatenate p using 0? Just under the last element of p or two 0 before and two 0 behind?
What I really want to know is the exact form of deconvoution in programs. Really Really appraciate it if anyone could help. Please!

Respuestas (1)

William Rose
William Rose el 25 de Sept. de 2024
Here is an examle, using d=[1 2 3 4 5], which you suggested. Since d has length 5, then the convolution d*w = p (where * indicates convolution) will be 4 elements longer than w. So if w has length 5, p will have length 9, etc. For this example, I will assume w has length 6, in order to demonstrate that the length of w does not have to equal the length of d. I will do the forward convoltion (compute p=d*w) first. Then I will do the inverse convolution.
Compute Toeplitz matrix:
w=[-1 0 1 2 1 3]';
d=[1 2 3 4 5]';
%nr=length(d)+length(w)-1; % rows in Toeplitz matrix
%nc=length(w); % columns in Toeplitz matrix
c=[d;zeros(length(w)-1,1)]; % column 1 of Toeplitz matrix
r=[1,zeros(1,length(w)-1)]; % row 1 of Toeplitz matrix
D=toeplitz(c,r);
disp(D)
1 0 0 0 0 0 2 1 0 0 0 0 3 2 1 0 0 0 4 3 2 1 0 0 5 4 3 2 1 0 0 5 4 3 2 1 0 0 5 4 3 2 0 0 0 5 4 3 0 0 0 0 5 4 0 0 0 0 0 5
Use D to compute p=convolution of d with w:
p=D*w;
disp(p')
-1 -2 -2 0 3 15 22 23 17 15
Compute estimate of w, from p, using the Toeplitz matrix:
wEst=inv(D'*D)*D'*p;
disp(wEst')
-1.0000 -0.0000 1.0000 2.0000 1.0000 3.0000
The result shows that the estimate of w equals the original w.
  4 comentarios
Junjie Zhao
Junjie Zhao el 6 de Nov. de 2024 a las 7:21
Editada: Junjie Zhao el 6 de Nov. de 2024 a las 7:22
Sorry for not replying your answer timely. Thank you so much for your effort. However, what I want to know is how should I process p in the deconvolution operation to achieve the effect of deconvolution. If you could help me with this, I will be very grateful.
William Rose
William Rose el 7 de Nov. de 2024 a las 3:20
In the discussion above, p is the convolution of d and w. If you know p and d, you can estimate w by deconvolution, as follows (and as described above):
First, let's create p, by convolution:
w=[-1 0 1 2 1 3]';
d=[1 2 3 4 5]';
p=conv(d,w);
Now, let's pretend we don't know w. We want to estimate w, by deconvolution of p and d:
nw=length(p)-length(d)+1; % length of w, based on lengths of d and p
D=convmtx(d,nw); % matrix for deconvolution
wEst=inv(D'*D)*D'*p; % estimate of w, by deconvolution
disp(wEst')
-1.0000 -0.0000 1.0000 2.0000 1.0000 3.0000
Note that wEst equals w, which shows the deconvolution worked.

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