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Stručni rad

https://doi.org/10.32762/zr.20.1.14

Matrix Decomposition

Ines Radošević Medvidović ; Odjel za matematiku, Sveučilište u Rijeci, Rijeka, Hrvatska
Kristina Pedić orcid id orcid.org/0000-0001-8277-7777 ; Odjel za matematiku, Sveučilište u Rijeci, Rijeka, Hrvatska


Puni tekst: hrvatski pdf 878 Kb

str. 227-242

preuzimanja: 1.367

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Sažetak

Matrices are divided into different classes, depending on the form and specific properties of the matrix. Matrix factorizations depend on the properties of certain class of matrices, hence matrix factorization are of great importance in the matrix theory, in the analysis of numerical algorithms and even in numerical linear algebra. A factorization of the matrix A is a representation of A as a product of several "simpler" matrices, which makes the problem at hand easier to solve. Factorizations of matrices into some special sorts of matrices with similarity are of fundamental importance in matrix theory, like Schur decomposition, spectral decomposition and the singular value decomposition. Furthermore, the basic tool for solving systems of linear equations, as one of the basic problems of numerical linear algebra, is the LU factorization. Also, it is important to mention QR factorization and its calculation through rotation and reflectors.

Ključne riječi

numerical analysis; matrix theory; Jordan canonical form; Schur decomposition; LU decomposition; QR decomposition; singular value decomposition

Hrčak ID:

201847

URI

https://hrcak.srce.hr/201847

Datum izdavanja:

19.6.2018.

Podaci na drugim jezicima: hrvatski

Posjeta: 2.602 *