Mark's Homework 15
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Problem
Make a MATLAB script to do four times oversampling and a filter so as to eliminate as much as possible the effect of the D/A converter that follows the interpolation filter.
MATLAB Script
The following is currently NON-WORKING. A working script will follow.
clear all; close all; N = 50; %Number of sample points for our original signal tmax=2; %Time, in seconds, to extend our original signal. We then sample this signal N times oversampling = 4; %Number of oversampling points T=tmax/N; %Calculate T, the sample period t=0:T:(N)*T; x=sin(2*pi*t)+sin(2*pi*2*t)+sin(2*pi*5*t); %This is our signal to over sample N1=(oversampling-1)*N; X=fft(x); X1 = (N1+N)/N*[X(1:N/2), zeros(1, N1), X(N/2+1:N)]; %This is our interpolating filter x2= ifft(X1); figure(7) t1 = 0:N/(N+N1)*T:(N-1/(N1+N))*T; plot(t1, x2, 'bo'); hold on t=0:T:(N)*T; plot(t, x, 'ro', t, x, 'r-'); hold off f = -1/(2*T):1/(N*T):1/(2*T); figure(8) plot(f, abs(fftshift(x))) %This is to cancel out the effects of the D/A Converter sT = T/100; %sT is hwo many times we are going to sample our pulse p(t) stmax = oversampling*T; %This is how wide our pulse has to be when we oversample sN = stmax/sT; %This is the total number of sampling points for sampling p(t) t = 0:sT:stmax-sT; p = u(t+1e-9) - u(t-T/(2*oversampling)) + u(t - (oversampling*T-T/(2*oversampling))); %This is p(t) sampled P = fft(p); iP = 1./P; %Take 1/P(f) so we cancel the effects of the D/A converter (which is P(f)) numpoints = 2*T/sT; %We can only go out to 1/(2*T) on the 1/P(f). The rest we need to zero out. iP = [iP(1:numpoints) zeros(1, sN-numpoints*2-1) iP(sN-numpoints:sN)] iP = iP(1:sN/(N1+N):sN); %Down sample 1/P(f) so we can element multiply with our interpolating filter %This plots P(f) f = -1/(2*sT):1/(sN*sT):1/(2*sT)-1/(sN*sT); Ps = fftshift(P); %Shift P(f) %Figure 4 plots P(f) shifted figure(4) plot(f, abs(Ps)); %Figure 5 plots P(f) shifted and zoomed in the f axis figure(5) plot(f(sN/2-numpoints+1:sN/2+numpoints), abs(Ps(sN/2-numpoints+1:sN/2+numpoints))); X1 = X1 .* iP; %Element multiply our interpolating filter with our D/A converter effect canceller filter x1 = ifft(X1); %Figure 1 plots the original signal and our interpolated signal (with D/A %converter effects cancelled.) figure(1) t1 = 0:N/(N+N1)*T:(N-1/(N1+N))*T; plot(t1, x2, 'bo'); hold on t=0:T:(N)*T; plot(t, x, 'ro', t, x, 'r-'); hold off %Figure 2 plots just our interpolated signal, but this time with lines %connecting each point. figure(2) plot(t1, x1, 'b-'); %Figure 3 plots the frequency response of our original sampled signal. figure(3) Xs((N+1)/2:N) = X(1:(N+1)/2); %The fftshift didn't work for me Xs(1:(N+1)/2) = X((N+1)/2:N); %So this manually shifts the FFT f = -1/(2*T):1/(N*T):1/(2*T)-1/(N*T); plot(f,abs(Xs)) %figure(4) %plot(f, abs(fftshift(X1)))