Homomorphisms between mapping class groups

Abstract

Suppose that X and Y are surfaces of finite topological type, where X has genus g≥ 6 and Y has genus at most 2g-1; in addition, suppose that Y is not closed if it has genus 2g-1. Our main result asserts that every non-trivial homomorphism (X) (Y) is induced by an embedding, i.e. a combination of forgetting punctures, deleting boundary components and subsurface embeddings. In particular, if X has no boundary then every non-trivial endomorphism (X)(X) is in fact an isomorphism. As an application of our main theorem we obtain that, under the same hypotheses on genus, if X and Y have finite analytic type then every non-constant holomorphic map (X)(Y) between the corresponding moduli spaces is a forgetful map. In particular, there are no such holomorphic maps unless X and Y have the same genus and Y has at most as many marked points as X.