On groups of H\"older diffeomorphisms and their regularity

Abstract

We study the set Dn,β( Rd) of orientation preserving diffeomorphisms of Rd which differ from the identity by a H\"older Cn,β0-mapping, where n ∈ N 1 and β ∈ (0,1]. We show that Dn,β( Rd) forms a group, but left translations in Dn,β( Rd) are in general discontinuous. The groups Dn,β-( Rd) := α < β Dn,α( Rd) (with its natural Fr\'echet topology) and Dn,β+( Rd) := α > β Dn,α( Rd) (with its natural inductive locally convex topology) however are C0,ω Lie groups for any slowly vanishing modulus of continuity ω. In particular, Dn,β-( Rd) is a topological group and a so-called half-Lie group (with smooth right translations). We prove that the H\"older spaces Cn,β0 are ODE closed, in the sense that pointwise time-dependent Cn,β0-vector fields u have unique flows in Dn,β( Rd). This includes, in particular, all Bochner integrable functions u ∈ L1([0,1],Cn,β0( Rd, Rd)). For the latter and n 2, we show that the flow map L1([0,1],Cn,β0( Rd, Rd)) C([0,1], Dn,α( Rd)), u , is continuous (even C0,β-α), for every α < β. As an application we prove that the corresponding Trouv\'e group Gn,β( Rd) from image analysis coincides with the connected component of the identity of Dn,β( Rd).