Explicit Homology Representation for Finite Groups Acting on Riemann Surfaces

Abstract

Given a finite group G acting orientably on a surface S of genus σ≥ 2, the group G acts faithfully on the homology group H1(S;Z), preserving the symplectic intersection form. The action on S and the homology is determined by a generating vector, a tuple of elements of G, generating G and satisfying certain properties. In this note we show how to compute the homology representation, using the generating vector, when S/G has genus 0 and the genus is suitably low. A 2σ× 2σ representing matrix can be determined for any element in the group, usually for a small set of generators. The matrices are computed with respect to an auto-generated basis for the cellular homology of S, using a regular CW structure on S, derived from the G action. We demonstrate the application of these results by computing invariant theta characteristics of the Riemann surfaces S with the algorithm implemented using Sage.