Abelian quotients of subgroups of the mapping class group and higher Prym representations

TL;DR

This paper investigates the conjecture that large-genus surface mapping class groups do not virtually surject onto Z, relating it to higher Prym representations which generalize the classical symplectic representation.

Contribution

It proves that if the conjecture holds for some genus, it holds for all larger genera, and if a counterexample exists, it must be of a simple form, using higher Prym representations.

Findings

The conjecture's validity propagates to higher genera.

Counterexamples, if any, are of a simple form.

Higher Prym representations generalize classical symplectic representations.

Abstract

A well-known conjecture asserts that the mapping class group of a surface (possibly with punctures/boundary) does not virtually surject onto $\Z$ if the genus of the surface is large. We prove that if this conjecture holds for some genus, then it also holds for all larger genera. We also prove that if there is a counterexample to this conjecture, then there must be a counterexample of a particularly simple form. We prove these results by relating the conjecture to a family of linear representations of the mapping class group that we call the higher Prym representations. They generalize the classical symplectic representation.