Diffeomorphism groups of balls and spheres

Abstract

In this paper we discuss the relationship between groups of diffeomorphisms of spheres and balls. We survey results of a topological nature and then address the relationship as abstract (discrete) groups. We prove that the identity component Diff0(S2n-1) of the group of smooth diffeomorphisms of S2n+1 admits no nontrivial homomorphisms to the group of C1 diffeomorphisms of the ball Bm for any n and m. This result generalizes theorems of Ghys and Herman. We also examine finitely generated subgroups of Diff0(Sn) and produce an example of a finitely generated torsion free group Gamma with an action on the circle by smooth diffeomorphisms that does not extend to a C1 action of Gamma on the disc.