An exotic zoo of diffeomorphism groups on Rn

Abstract

Let C[M] be a (local) Denjoy-Carleman class of Beurling or Roumieu type, where the weight sequence M=(Mk) is log-convex and has moderate growth. We prove that the groups DiffB[M](Rn), DiffW[M],p(Rn), DiffS[L][M](Rn), and DiffD[M](Rn) of C[M]-diffeomorphisms on Rn which differ from the identity by a mapping in B[M] (global Denjoy--Carleman), W[M],p (Sobolev-Denjoy-Carleman), S[L][M] (Gelfand--Shilov), or D[M] (Denjoy-Carleman with compact support) are C[M]-regular Lie groups. As an application we use the R-transform to show that the Hunter-Saxton PDE on the real line is well-posed in any of the classes W[M],1, S[L][M], and D[M]. Here we find some surprising groups with continuous left translations and C[M] right translations (called half-Lie groups), which, however, also admit R-transforms.