Class number for pseudo-Anosovs

TL;DR

This paper investigates the conjugacy properties of pseudo-Anosov automorphisms of surface groups, establishing finiteness results, providing explicit examples, and exploring class numbers in hyperbolic orbifolds.

Contribution

It introduces a uniform finiteness theorem for pseudo-Anosov automorphisms, presents explicit examples of automorphisms with specific conjugacy properties, and connects these findings to class number concepts.

Findings

Finiteness theorem for pseudo-Anosov automorphisms

Explicit example of non-conjugate but commensurably conjugate automorphisms

Infinitely many automorphisms of hyperbolic orbifolds with class number one

Abstract

Given two automorphisms of a group $G$, one is interested in knowing whether they are conjugate in the automorphism group of $G$, or in the abstract commensurator of $G$, and how these two properties may differ. When $G$ is the fundamental group of a closed orientable surface, we present a uniform finiteness theorem for the class of pseudo-Anosov automorphisms. We present an explicit example of a commensurably conjugate pair of pseudo-Anosov automorphisms of a genus $3$ surface, that are not conjugate in the Mapping Class Group, and we also show that infinitely many independent automorphisms of hyperbolic orbifolds have class number equal to one. In the appendix, we briefly survey the Latimer-MacDuffee theorem that addresses the case of automorphisms of $\mathbb{Z}^n$, with a point of view that is suited to an analogy with surface group automorphisms.