Enumeration of alternating sign matrices of even size (quasi)-invariant   under a quarter-turn rotation

Jean-Christophe Aval (LaBRI); Philippe Duchon (LaBRI)

arXiv:0906.3445·math.CO·June 19, 2009·Electron. J. Comb.

Enumeration of alternating sign matrices of even size (quasi)-invariant under a quarter-turn rotation

Jean-Christophe Aval (LaBRI), Philippe Duchon (LaBRI)

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TL;DR

This paper derives an enumeration formula for alternating sign matrices of even size that are quasi-invariant under a quarter-turn rotation, linking counts of various symmetric ASM classes.

Contribution

It provides a proof of Duchon's conjectured enumeration formula involving quasi-invariant ASM counts.

Findings

01

Enumeration formula confirmed for quasi-invariant ASM of even size

02

Connection established between quasi-invariant ASM and symmetric ASM counts

03

Supports conjecture linking different ASM symmetry classes

Abstract

The aim of this work is to enumerate alternating sign matrices (ASM) that are quasi-invariant under a quarter-turn. The enumeration formula (conjectured by Duchon) involves, as a product of three terms, the number of unrestricted ASM's and the number of half-turn symmetric ASM's.

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