Pauli matrices and ring puzzles

Sylvain Barre; Mikael Pichot

arXiv:2009.02236·math.GR·September 7, 2020

Pauli matrices and ring puzzles

Sylvain Barre, Mikael Pichot

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TL;DR

This paper explores tessellations of the Euclidean plane derived from algebraic equations involving Pauli matrices, revealing new geometric structures linked to quantum algebra.

Contribution

It introduces a novel class of tessellations based on algebraic properties of Pauli matrices, connecting quantum algebra to geometric tilings.

Findings

01

New tessellations related to Pauli matrices

02

Connections between algebraic equations and geometric patterns

03

Potential applications in quantum geometry

Abstract

We study a family of tessellations of the Euclidean plane which are obtained by local developments of algebraic equations satisfied by the Pauli matrices.

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Taxonomy

TopicsGeometric and Algebraic Topology · Mathematics and Applications · Advanced Combinatorial Mathematics