Low dimensional linear representations of the mapping class group of a nonorientable surface

Abstract

Suppose that f is a homomorphism from the mapping class group M(Ng,n) of a nonorientable surface of genus g with n boundary components, to GL(m,C). We prove that if g 5, n 1 and m g-2, then f factors through the abelianization of M(Ng,n), which is Z2×Z2 for g∈\5,6\ and Z2 for g 7. If g 7, n=0 and m=g-1, then either f has finite image (of order at most two if g 8), or it is conjugate to one of four "homological representations". As an application we prove that for g 5 and h<g, every homomorphism M(Ng,0)(Nh,0) factors through the abelianization of M(Ng,0).