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FFT and changing frequency and vectorizing for loop

Greetings All

I can increase and decrease the frequency of a signal using the combination of fft and a Fourier series expansion FOR loop in the code below but if the signal/array is to large it becomes extremely slow (an array that's 1x44100 takes about 2 mins to complete) I'm sure it has to do with the for loop but I'm not exactly sure how to vectorize it to improve performance. Please note that this will be used with audio signals that are 3 to 6 mins long. The 1x44100 array is only a second and it takes about 2 mins to complete

Any recommendations

%create signal
clear all, clc,clf,tic
x= linspace(0,2*pi,44100)';

%Used in exporting to ycalc audio file make sure in sync with above
freq_orig=1;
freq_new=4
vertoff=0;
vertoffConj=0;
vertoffInv=0;
vertoffInvConj=0;
phaseshift=(0)*pi/180 ; %can use mod to limit to 180 degrees

y=sin(freq_orig*(x));
[size_r,size_c]=size(y);

N=size_r; %to test make 50
T=2*pi;
dt=T/N;
t=linspace(0,T-dt,N)';
phase = 0;
f0 = 1/T; % Exactly, one period

y=(y/max(abs(y))*.8)/2; %make the max amplitude here
C = fft(y)/N; % No semicolon to display output


A = real(C);
B = imag(C)*-1; %I needed to multiply by -1 to get the correct sign

% Single-Sided (f >= 0)
An = [A(1); 2*A(2:round(N/2)); A(round(N/2)+1)]; 
Bn = [B(1); 2*B(2:round(N/2)); B(round(N/2)+1)];

pmax=N/2;
ycalc=zeros(N,1); %preallocating space for ycalc
w=0;

for p=2:pmax
               %
       %%1 step) re-create signal using equation
        ycalc=ycalc+An(p)*cos(freq_new*(p-1).*t-phaseshift)
+Bn(p)*sin(freq_new*(p-1).*t-phaseshift)+(vertoff/pmax);
        w=w+(360/(pmax-1)); %used to create phaseshift
        phaseshift=w;

end;

fprintf('\n- Completed in %4.4fsec or %4.4fmins\n',toc,toc/60);

subplot(2,1,1), plot(y),title('Orginal Signal');
subplot(2,1,2),plot(ycalc),title('FFT new signal');

Here's a pic of the plot if some one wants to see the output, which is correct the FOR loop is just really really slow

enter image description here

1 Answer 1

1

It appears as though you are basically shifting the signal upwards in the frequency domain, and then your "series expansion" is simply implementing the inverse DFT on the shifted version. As you have seen, the naive iDFT is going to be exceedingly slow. Try changing that entire loop into a call to ifft, and you should be able to get a tremendous speedup.

1
  • Yes I am using the "Fourier series expansion" (sin/cos) to do a inverse DFT. I've found that for me it's much easier to fully understand and control almost all aspects of altering the new signal. I have used the fft/ifft to take a signal from the time domain to the frequency domain. The thing is I'm not sure where to start for this problem increasing/decreasing frequency and/or adjusting phase using ifft. Does anyone have an examples on this?
    – Rick T
    Apr 2, 2011 at 23:56

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