Jordan Matrix Decomposition

Karol Pąk

Open Access

Jordan Matrix Decomposition

Karol Pąk

| Mar 20, 2009

Formalized Mathematics

Volume 16 (2008): Issue 4 (January 2008)

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Page range: 297 - 303

DOI: https://doi.org/10.2478/v10037-008-0036-9

This content is open access.

In this paper I present the Jordan Matrix Decomposition Theorem which states that an arbitrary square matrix M over an algebraically closed field can be decomposed into the form

where S is an invertible matrix and J is a matrix in a Jordan canonical form, i.e. a special type of block diagonal matrix in which each block consists of Jordan blocks (see [13]).

MML identifier: MATRIXJ2, version: 7.9.01 4.101.1015

eISSN:: 1898-9934
ISSN:: 1426-2630
Language:: English

Publication timeframe:: 4 times per year
Journal Subjects:: Computer Sciences, other, Mathematics, General Mathematics

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Jordan Matrix Decomposition

Published Online: Mar 20, 2009

Page range: 297 - 303

DOI: https://doi.org/10.2478/v10037-008-0036-9

This content is open access.