Injective homomorphisms of mapping class groups of non-orientable surfaces

Abstract

Let N be a compact, connected, non-orientable surface of genus with n boundary components, with 5 and n 0, and let M (N) be the mapping class group of N. We show that, if G is a finite index subgroup of M (N) and : G M (N) is an injective homomorphism, then there exists f0 ∈ M (N) such that (g) = f0 g f0-1 for all g ∈ G. We deduce that the abstract commensurator of M (N) coincides with M (N).