Fourier transformation of a function solved by ODEs?

Question

Yuhong Jin 2019 年 11 月 26 日

0
リンク

この質問への直接リンク

https://jp.mathworks.com/matlabcentral/answers/493347-fourier-transformation-of-a-function-solved-by-odes

コメント済み: Yuhong Jin 2019 年 11 月 28 日

Hi,

I was trying to fourier transform a function solved by ode15s using the code below:

function main2()
   % need function since in a script, one cannot define function vdp1
   
  [t,X]=ode15s(@rate,[0:0.01:10],[1.86;3.2;0.4]);
  N = size(X(:,3));
  T = 0.01;
  P = abs(fft(X(:,3)))./(N/2);
  P = P(2:N/2-1).^2;
  F = [2:N/2-1]'/T;
  loglog(F,P)
  
  
 
end
function dXdt=rate(t,X)
 
      if t>0 && t<0.0225
          c=0.1.*t;
      elseif t>0.0225 && t<0.045
          c=-0.1.*t+0.0045;
      else 
          c=0;
      end
      
 
  F = 10.*(1-0.5.*X(1)+log((1+c./0.02)./(1+c./0.5)));
  A = 1./(1+exp(F));
  
  dmdt= 0.1.*(1-A)-0.2.*A;
  dYdt= 0.182*17.9.*A.*(9.7-X(2))-2.2.*X(2);
  dPdt=(0.75+0.1.*(X(2)-3.2)).*(1-X(3))-(1.13-10.*(X(2)-3.2)).*X(3);
  dXdt=[dmdt;dYdt;dPdt];
end

Here the second function is not important as I run and plotted the ode solved function and this worked successfully.

Could anyone please helped to whether the fourier transform part below the ode solver in the main2 function is correct (shown above and pasted below)?

N = size(X(:,3));
  T = 0.01;
  P = abs(fft(X(:,3)))./(N/2);
  P = P(2:N/2-1).^2;
  F = [2:N/2-1]'/T;
  loglog(F,P)
  

What I am doing here is to fourier transform the third function calculated in the [t , X] matrix and plot a log-log graph.

I also omitted the first wave number, which just corresponds to the sum of all the time-course data.

I am not sure if the T value I used here, equal to the time step for ode solver is correct?

I got this graph below but it does not look right

I would be really grateful if anyone could help me.

Thanks in advance

0 件のコメント
-2 件の古いコメントを表示-2 件の古いコメントを非表示

サインインしてコメントする。

サインインしてこの質問に回答する。

Answer 1

Ridwan Alam 2019 年 11 月 26 日

0
リンク

この回答への直接リンク

https://jp.mathworks.com/matlabcentral/answers/493347-fourier-transformation-of-a-function-solved-by-odes#answer_403501

編集済み: Ridwan Alam 2019 年 11 月 26 日

MATLAB Online で開く

Not sure why you squared the fft, but the frequency range needs to be as follows:

N = length(X(:,3));
T = 0.01;
Fs = 1/T;
P1 = abs(fft(X(:,3)))/N;
P = P1(1:N/2+1);
P(2:end-1) = 2*P(2:end-1);
F = Fs*(0:N/2)/N;
loglog(F,P)

Hope this helps!

3 件のコメント
1 件の古いコメントを表示1 件の古いコメントを非表示

Ridwan Alam 2019 年 11 月 28 日

編集済み: Ridwan Alam 2019 年 11 月 28 日

The reason I multiply the P(2:end-1) by 2: FFT generates a two sided (symmetric around f=0) spectrum (here P1) including negative frequencies. P is the one-sided part, where P(1) refers to f=0. Since P is halved in spectrum, the components for f>0 needs to be doubled to reflect the symmetric components in the negative spectrum.

The power spectrum part was not in your question, so I got confused.

I am also not sure what you mean by wave number in an FFT. Please explain and I will try to help.

Yuhong Jin 2019 年 11 月 28 日

B6F1AF2F-74B9-481F-9499-58E8E11118BE.jpeg

</matlabcentral/answers/uploaded_files/251072/B27786C0-289E-41E7-A641-728387941404.jpeg> This is the full question I want to solve, and the wavenumber here means frequency (I suppose), so I started from the second one.

サインインしてコメントする。

Fourier transformation of a function solved by ODEs?

0 件のコメント
-2 件の古いコメントを表示-2 件の古いコメントを非表示

回答 (1 件)

3 件のコメント
1 件の古いコメントを表示1 件の古いコメントを非表示

参考

カテゴリ

タグ

Community Treasure Hunt

Fourier transformation of a function solved by ODEs?

0 件のコメント -2 件の古いコメントを表示-2 件の古いコメントを非表示

回答 (1 件)

3 件のコメント 1 件の古いコメントを表示1 件の古いコメントを非表示

参考

カテゴリ

タグ

Community Treasure Hunt

0 件のコメント
-2 件の古いコメントを表示-2 件の古いコメントを非表示

3 件のコメント
1 件の古いコメントを表示1 件の古いコメントを非表示