Matlab - FFT/PSD Problem for Preemphasis
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So my plan is the following (create "adaptive" pre/deemp. using Matlab 2015a):
- 1. Read an Audiodata ([y,fs]) and generate white Noise with a certain SNR ([n,fs])
- 2. Generate a Filter H which shapes the PSD(y) similiar to the PSD(n)
- 3. Generate an inverse Filter G=H^(-1) which reverts the effect of H.
- 4. Get the output signal
The code I was thinking to use for this is the following:
[y,fs]=audioread('test.wav');
snr=5;
n=awgn(y,snr,'measured')-y;
[pyy,f]=pwelch(y,[],[],length(y)*2-1,fs);
[pnn,fn]=pwelch(n,[],[],length(y)*2-1,fs);
H=sqrt(snr*pnn./pyy);
G=1./H;
outy=ifft(fft(y).*H.*G);
outn=ifft(fft(n).*G);
out=outy+outn;
[pout,fout]=pwelch(outy,[],[],length(outy)*2-1,fs);
[pnout,fnout]=pwelch(outn,[],[],length(outn)*2-1,fs);
There are two problems when using the code above:
- 1. The pnout should be shaped liked pout (which it isn't).
- 2. The outputsignals (outy,outn) are both complex and therefore it is not possible to play the outputfile.
If I try it another way:
[y,fs]=audioread('test.wav');
snr=5;
n=awgn(y,snr,'measured')-y;
N=length(y);
bin_vals=0:N-1;
fax_Hz= bin_vals*fs/N;
N_2=ceil(N/2);
pyy=(fft(y).*conj(fft(y)));
pnn=(fft(n).*conj(fft(n)));
H=sqrt(snr*pnn./pyy);
G=1./H
outy=ifft(fft(y).*H.*G);
outn=ifft(fft(n).*G);
out=outy+outn;
I don't come across the previous problems but in this case I don't use a real PSD but the squared absolute of the frequencydomain-values. (and as I understand it this would give me the power spectrum and not the power spectral density)
Any ideas why my first way is wrong or how to change my second way to get a real "proper" PSD and not just the PS?
Thanks! Klaus
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Answers (2)
Youssef Khmou
on 19 Apr 2015
When using the reverse fft function, we take the real part, in one of the equations H.*G is not necessary since G=H.^-1, another method to generate noise is given in the following version, however it still needs scaling operation.
[y,fs]=audioread('test.wav');
snr=5;
sy=std(y);
sn=sy/snr;
n=sn*randn(size(y));
[pyy,f]=pwelch(y,[],[],length(y)*2-1,fs);
[pnn,fn]=pwelch(n,[],[],length(y)*2-1,fs);
H=sqrt(pnn./(pyy*snr));
G=1./H;
outy=(real(ifft(fft(y))));
outn=(real(ifft(fft(n).*G)));
out=outy+outn;
[pout,fout]=pwelch(outy,[],[],length(outy)*2-1,fs);
[pnout,fnout]=pwelch(outn,[],[],length(outn)*2-1,fs);
figure;
plot(fnout,pout,fnout,pnout,'r');
Youssef Khmou
on 19 Apr 2015
I think the first question is not well interpreted, maybe it consists of generating noisy version of y instead of white noise, in this case, the result is sufficiently accurate :
[y,fs]=audioread('test.wav');
snr=5;
n=awgn(y,snr,'measured');
[pyy,f]=pwelch(y,[],[],length(y)*2-1,fs);
[pnn,fn]=pwelch(n,[],[],length(y)*2-1,fs);
H=sqrt(pnn./(pyy*snr));
G=1./H;
outy=real(ifft(fft(y).*H.*G));
outn=real(ifft(fft(n).*G));
out=outy+outn;
[pout,fout]=pwelch(outy,[],[],length(outy)*2-1,fs);
[pnout,fnout]=pwelch(outn,[],[],length(outn)*2-1,fs);
figure;
semilogy(fout,pout,fnout,pnout,'r');grid on;
xlabel('fr [Hz]');
ylabel('magnitude ');
4 Comments
Youssef Khmou
on 20 Apr 2015
Edited: Youssef Khmou
on 20 Apr 2015
Here is another solution using two sided psd rather than one sided (psd or pwelch) in this case, we use the absolute value of fft :
% data
clear;
fs=1000;
ts=1/fs;
f=fs/4;
t=0:ts:0.1-ts;
y=sin(2*pi*f*t);
% altered part
snr=5;
sy=std(y);
sn=sy/snr;
n=sn*randn(size(y));
pyy=abs(fft(y));
pnn=abs(fft(n));
H=sqrt(pnn./(pyy*snr));
G=1./H;
outy=y;
outn=real(ifft(fft(n,length(y)).*G));
out=outy+outn;
[pout,fout]=psd(outy);
[pnout,fnout]=psd(outn);
figure;
semilogy(fout,pout,fnout,pnout,'r');grid on;
xlabel('fr [Hz]');
ylabel('magnitude ');
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