below is my code
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lam=1552; %%%nm
lamd=lam*10^(-9); %%m
c=3e8;freq=c/lamd; %%Hz
gbps=32e9; %%Hztb=1/gbps; %%s
lng=10; %%km
beta=0.1;deltaf=beta/2/tb;disp=0.088/4*(lam-(1317^4)/(lam^3)); %%ps/(nm*km)
deltat=-disp*lng*c*(10^9)*deltaf/(freq^2); %%ps
%%%%%%%%%%%%%%FFT
L=80e-11; %%%spatial extent
dt=1e-13; %%1 second - sample spacing
N=L/dt; %%% number of samples
t=(-N/2:N/2-1)*dt;f=(-N/2:N/2-1)/(N*dt);hfunct=sinc(t/pi/tb);figure();plot(t,hfunct); %%%confirmed
hfft=fftshift(fft(fftshift(hfunct)))*dt;NN=10;fv=f(N/4:3*N/4-1);hv=hfft(N/4:3*N/4-1);figure();plot(fv,hv);
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The important part is after FFT.
when I transformed sinc function, it should give signum fuction, and it did. But the problem is, it looks like as if it were taken from very far distance.
How do I see FT graph more closely?
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