Matrix inverse and determinant

Version 1.0.0.0 (1,37 ko) par Feng Cheng Chang
Finding inverse and determinant of matrix by order expansion and condensation
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Mise à jour 16 déc. 2015

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The inverse and determinant of a given square matrix can be computed by the following routine applying simultaneously matrix order expansion and condensation. After completing the iteration, the expansion process results in the inverse of the given matrix (invM), and the condensation process generate an array of pivot elements (p) which eventualy gives the determinant (detM) of the given matrix (M):
[invM,detM,p,s,rc] = inv_det_opt(M).
In summary: (1) if the given matrix is non-singular then its determinant is found to be equal to the product of pivot elements. (2) if the last pivot element is found shrinking sharply toward zero, then the given matrix is said to be singular.

Citation pour cette source

Feng Cheng Chang (2024). Matrix inverse and determinant (https://www.mathworks.com/matlabcentral/fileexchange/48600-matrix-inverse-and-determinant), MATLAB Central File Exchange. Récupéré le .

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Créé avec R12
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Inspiré par : inv_det_0(A), mtx_d(A,D,d)

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Version Publié le Notes de version
1.0.0.0

Update and re-write the m-code.
This author dose not expect anyone can provide any square matrix (as huge as 1000x1000) that can disprove the results by applying this optimal iteration processing routine.