Inverse and determinant of square matrix
The inverse (AI) and determinant (det) of a given square matrix (AO) may be directly found by
[AI,det] = inv1(AO)
It uses automatic pivoting scheme. All computations involves only simple matrix multiplication.
The direct result without pivoting may also be found by
AI = inv0(AO)
The sourse code is only 4 statement lines. Yet it works for AO = randn(n), even n = 1000.
However, it fails for some simple peculiar matrix, such as AO = [0 1; 1 0].
Citation pour cette source
Feng Cheng Chang (2024). Inverse and determinant of square matrix (https://www.mathworks.com/matlabcentral/fileexchange/38819-inverse-and-determinant-of-square-matrix), MATLAB Central File Exchange. Récupéré le .
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Inspiré par : GINV(X), inv4spd.m, InvSWM_F(xcoord,ycoord,lower,upper,RowStdOpt), Update Inverse Matrix
A inspiré : inv_det_0(A)
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Version | Publié le | Notes de version | |
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1.5.0.0 | Update the m-file, involving direct automatic optional pivoting scheme. |
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1.4.0.0 | Updated after some crucial comments. |
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1.3.0.0 | updated to including pivotings. |
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1.2.0.0 | update m-file |
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1.0.0.0 |