2D FFT interpolation - Keeping the amplitude

Question

canadarunner 2023년 8월 7일

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이 질문에 대한 바로 가기 링크

https://kr.mathworks.com/matlabcentral/answers/2005547-2d-fft-interpolation-keeping-the-amplitude

댓글: canadarunner 2023년 8월 7일

% input

matrix = [1.41 + 0.31i,-0.480 + 1.47i,-1.67 + 2.23i,-2.38 + 2.02i,-2.07 + 1.47i,-1.11 + 0.34i,-0.0900 - 0.65i,0.700 - 0.79i,1.14 - 0.36i;...

0.180 - 0.10i,-1.22 + 0.51i,-1.66 + 0.86i,-0.590 + 0.070i,0.410 + 0.070i,0.0300 + 0.99i,-0.300 + 0.67i,0.430 + 0.23i,0.640 + 0.09i;...

2.11 - 1.18i,0.350 - 1.01i,-0.850 - 0.84i,-0.200 - 1.74i,1.29 - 1.62i,1.59 - 0.16i,1.40 - 0.16i,1.65 - 0.36i,1.53 + 0.13i;...

0.990 - 2.39i,1.40 - 1.85i,4.22 - 0.01i,6.95 + 1.01i,6.11 + 0.90i,3.04 + 0.17i,1.06 - 0.34i,0.640 - 0.98i,0.900 - 0.71i;...

1.07 - 2.58i,1.73 - 0.80i,8.23 + 3.39i,16.28 + 7.73i,15.16 + 8.35i,6.40 + 4.22i,0.350 + 0.79i,-0.610 - 0.46i,-0.200 - 0.27i;...

1.73 - 1.20i,-0.200 + 0.94i,0.170 + 3.56i,3.85 + 5.13i,4.89 + 5.21i,2.14 + 2.96i,0.0300 + 0.12i,0.190 - 0.71i,0.470 + 0.19i;...

2.48 - 0.46i,1.02 + 1.28i,-1.16 + 2.32i,-1.67 + 1.71i,-0.890 + 0.55i,-0.100 + 0.21i,0.270 - 0.34i,0.710 - 0.57i,0.930 - 0.17i;...

2.01 + 3.41i,2.02 + 2.68i,-0.130 + 2.40i,-1.26 + 1.97i,-1.21 + 2.15i,0.0600 + 1.64i,1.06 + 0.88i,0.620 + 0.58i,-0.0500 + 0.31i;...

-0.230 + 7.51i,0.400 + 2.68i,-0.760 + 1.70i,-1.46 + 1.57i,-2.02 + 1.70i,-1.42 + 1.35i,0.00 + 1.16i,-0.330 + 0.86i,-1.19 + 0.56i];

% 2d FFT interpolation

interpol_size = 100;

k = fft2(matrix);

k = fftshift(k);

k_scale = padarray(k,[interpol_size,interpol_size]/2,'both');

k_scale = ifftshift(k_scale);

k_interpol = ifft2(k_scale);

% plot

tiledlayout(1,2)

nexttile

imagesc(abs(matrix))

colorbar

cb = colorbar;

cb.Label.String = "power (10*log10(abs(x))) [dB]";

title('original')

axis square

nexttile

imagesc(10*log10(abs(k_interpol)))

colorbar

cb = colorbar;

cb.Label.String = "power (10*log10(abs(x))) [dB]";

title('2Dfft interpolated')

axis square

I tried to interpolate the original data with a 2d fft, but afterwards unfortunately I don't get the same amplitude values. Altough I expect the values to be equal or bigger than the original based on the sampling theory.

I checked https://ch.mathworks.com/matlabcentral/answers/1900240-effect-of-zero-padding-on-fft-amplitude?s_tid=sug_su , but unfortunately I don't get it do extrapolate the information there into the multidimensional space (in my case 2d).

I know that interpft should work, but this works just in 1d.

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Answer 1

Paul 2023년 8월 7일

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이 답변에 대한 바로 가기 링크

https://kr.mathworks.com/matlabcentral/answers/2005547-2d-fft-interpolation-keeping-the-amplitude#answer_1284287

MATLAB Online에서 열기

Hi canadarunner,

The plot on the left is amplitude and the plot on the right is in dB. Changing the left plot to dB brings the plots closer.

In the same units, would you expect the values in the plot on the left to be larger?

Scaling the interpolated values by the numel(k_interpol)/numel(matrix) would then bring the two plots into alignment. I don't think that's a coincidence, but would have to give more thought to justify doing so.