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- Verify the convolution theorem 1 answer
Good day to everyone!
I tried to tackle the basic problem of obtaining the original signal from observing its convolution with some known impulse response.
But the results I get are somehow totally wrong, and probably I have a mix of different wrong steps here. I've already looked through similar topics here and on other sites like developpez, but failed to figure out the cause. I would appreciate any help.
Let's say my true signal f[.] is just an impulse at the time 1, and the impulse response g[.] is Gaussian. I compute their convolution h[.] by
conv(), and then, basically, want to find
ifft( fft[h]./fft[g] ), expecting this to be f[.].
The first problem is that
conv() makes an array of the n+m-1 elements, where n,m are the lengths of the argument arrays. So, to perform
fft[h]./fft[g] I need to do smth with the length of g. It's the first suspicious place where I may act wrong (see the code). What's the right way to do it?
The second problem is that I get something very different from what the initial true signal.
The third problem is that I can't understand how to takle the signal shifts. In matlab, I have to operate with positive-time signals, but, for example, the gaussian impulse response has both time-negative and time-positive elements, so, to work with it here, I need to shift it 'forward' (the peek will move to the right), and than I need to 'de-shift' the result?
Here's my crap on that :)
close all; TrueSignal = zeros( 101, 1 ); % impulse in t = 1. TrueSignal( 1 ) = 1; ImpulseResp = normpdf(-1:0.02:1)/normpdf( 0 ); % 101 elements array figure; subplot( 2,2,1 ); title('True signal') plot( TrueSignal ); subplot( 2,2,2 ); title('Impulse response') plot( ImpulseResp ); Conv = conv( TrueSignal, ImpulseResp ); % produces 201 elements array. subplot( 2,2,3 ); title('Convolution') plot( Conv ); % Wrong? I need a 201 elements array to represent the impulse response. ImpulseResp_sparse = normpdf( -1:0.01:1 )/normpdf( 0 ); FIR = fft( ImpulseResp_sparse )/201; Inverse = ifft( fft( Conv )./FIR ); % UPD Added fft() according to one of comments, bad mistake, but still not preventing. subplot( 2,2,4 ); title('What is that???') plot( abs( Inverse ) ); % It's weird! With no abs(), result is even more weird!