Determination of a Special Case of Symmetric Matrices and Their Applications

Zhelezov, Ognyan Ivanov (2021) Determination of a Special Case of Symmetric Matrices and Their Applications. In: Current Topics on Mathematics and Computer Science Vol. 6. B P International, pp. 29-45. ISBN 978-93-91473-06-8

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Abstract

This article presents a special case of symmetric matrices, matrices of transpositions (Tr matrices) that are created from the elements of given n-dimensional vector XÎRn, n=2m, mÎN. Has been proved that Tr matrices are symmetric and persymmetric. Has been proposed algorithm for obtaining matrices of transpositions with mutually orthogonal rows (Trs matrices) of dimensions 2, 4, and 8 as Hadamard product of Tr matrix and matrix of Hadamard and has been investigated their application for QR decomposition and n-dimensional rotation matrix generation. Tests and analysis of the algorithm show that obtaining an orthogonal Trs matrix of sizes 4 and 8 that rotates a given vector to the direction of one of the coordinate axes requires less processing time than obtaining a Housholder matrix of the same size. This makes the Tr and Trs matrices useful in matrix calculations.

Item Type: Book Section
Subjects: Science Repository > Computer Science
Depositing User: Managing Editor
Date Deposited: 21 Nov 2023 05:06
Last Modified: 21 Nov 2023 05:06
URI: http://research.manuscritpub.com/id/eprint/3169

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