Schur-type invariants of branched G-covers of surfaces

Abstract

Fix a finite group G and a conjugacy invariant subset C⊂eq G. Let be an oriented surface, possibly with punctures. We consider the question of when two homomorphisms π1() G taking punctures into C are equivalent up to an orientation preserving diffeomorphism of . We provide an answer to this question in a stable range, meaning that has enough genus and enough punctures of every conjugacy type in C. If C generates G, then we can assume has genus 0 (or any other constant). The main tool is a classifying space for (framed) C-branched G-covers, and related homology classes we call branched Schur invariants, since they take values in a torsor over a quotient of the Schur multiplier H2(G). We conclude with a brief discussion of applications to (2+1)-dimensional G-equivariant TQFT and symmetry-enriched topological phases.