How is calculated the determinant of a matrix containing a fourier transform?

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Erkan
Erkan on 8 Jul 2025
Commented: Erkan on 9 Jul 2025
Hi everyone. Let's assume that there are two paired differential equations as shown in equations 1 and 2 and that these equations are solved, that is, the values ​​of A and B are known. However, to find the behavior of and in the frequency domain, the time derivatives of these equations are taken by taking the Fourier transform to obtain equations 3 and 4. Then, when the linear equation system is formed using equations 3 and 4, how is jw calculated when finding the determinant of the coefficient matrix of the system?
Sample number: N=1024 and Sample frequency: Fs=4kHz
(1)
+ (2)
(3)
(4)
(5)
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Torsten
Torsten on 8 Jul 2025
Edited: Torsten on 8 Jul 2025
I thought you want to reconstruct F_A(omega) and F_B(omega) given A(omega) and B(omega). So why do you need a determinant to do this ? You can simply solve equation (3) for F_A(omega) and equation (4) for F_B(omega) (after computing the Fourier Transforms of A(t) and B(t)).

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Accepted Answer

Matt J
Matt J on 8 Jul 2025
Edited: Matt J on 8 Jul 2025
N=1024; Fs=4000;
f=(0:(N-1-ceil((N-1)/2)))/N*Fs;
jw = 1j*2*pi*f;
determinant = (jw-x2).*y1 - (jw-x1).*y2 ;
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Matt J
Matt J on 9 Jul 2025
Edited: Matt J on 9 Jul 2025
The general formula for the (two-sided) discrete frequency axis is,
NormalizedAxis = -ceil((N-1)/2) : +floor((N-1)/2);
deltaOmega=2*pi*Fs/N; %frequency sample spacing
w=deltaOmega*NormalizedAxis;

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