Enumeration of some particular quintuple persymmetric matrices over F_2   by rank

Jorgen Cherly

arXiv:1109.3623·math.NT·September 19, 2011

Enumeration of some particular quintuple persymmetric matrices over F_2 by rank

Jorgen Cherly

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TL;DR

This paper counts specific quintuple persymmetric matrices over the finite field F_2 based on their rank, providing exact enumeration formulas for these matrices.

Contribution

It introduces a novel enumeration method for particular quintuple persymmetric matrices over F_2 by their rank, filling a gap in matrix classification.

Findings

01

Derived explicit formulas for counting matrices by rank

02

Extended understanding of persymmetric matrix structures over F_2

03

Provided enumeration results for specific matrix classes

Abstract

In this paper we count the number of some particular quintuple persymmetric rank i matrices over F_2.

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Taxonomy

Topicsgraph theory and CDMA systems · Graph theory and applications · Advanced Topics in Algebra