Enumeration of some particular quadruple persymmetric matrices over F_2   by rank

Jorgen Cherly

arXiv:1106.2691·math.NT·June 15, 2011

Enumeration of some particular quadruple persymmetric matrices over F_2 by rank

Jorgen Cherly

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TL;DR

This paper counts specific quadruple persymmetric matrices over the finite field F_2 based on their rank, providing detailed enumeration for these structured matrices.

Contribution

It introduces a novel enumeration method for quadruple persymmetric matrices over F_2 classified by rank, filling a gap in matrix combinatorics.

Findings

01

Explicit formulas for the number of such matrices by rank

02

Enumeration results for matrices of various sizes and ranks

03

Insights into the structure of persymmetric matrices over F_2

Abstract

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

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Taxonomy

Topicsgraph theory and CDMA systems · Graph theory and applications · Graph Labeling and Dimension Problems