Simplicity of the contactomorphism group of finite regularity

Abstract

For a given coorientable contact manifold (M2n+1,), we consider the group Contc(r,δ)(M,α) consisting of Cr,δ contactomorphisms with compact support which is equipped with Cr,δ-topology of H\"older regularity (r,δ) for r ≥ 1 and 0 <δ ≤ 1. We prove that for all H\"older class exponents with r > n + 2 or r = n+1, \, 12 < δ ≤ 1 (resp. r < n+1 or r = n+1 and 0< δ <12), the group is a perfect (and so a simple) group. In particular, Contcr(M,) is simple for all integer r ≥ 1. For the case of Contc(r,δ)(M,α) of general H\"older regularity, we prove the simplicity for all pairs (r,δ) leaving only the case of (r,δ) = (n+1,12) open.