There are no exotic actions of diffeomorphism groups on 1-manifolds

Abstract

Let M be a manifold, N a 1-dimensional manifold. Assuming r ≠ (M)+1, we show that any nontrivial homomorphism : Diffrc(M) Homeo(N) has a standard form: necessarily M is 1-dimensional, and there are countably many embeddings φi: M N with disjoint images such that the action of is conjugate (via the product of the φi) to the diagonal action of Diffrc(M) on M × M × ... on i φi(M), and trivial elsewhere. This solves a conjecture of Matsumoto. We also show that the groups Diffrc(M) have no countable index subgroups.