The exponential law for spaces of test functions and diffeomorphism groups

Abstract

We prove the exponential law A(E × F, G) A(E, A(F,G)) (bornological isomorphism) for the following classes A of test functions: B (globally bounded derivatives), W∞,p (globally p-integrable derivatives), S (Schwartz space), D (compact sport, B[M] (globally DenjoyCarleman), W[M],p (SobolevDenjoyCarleman), S[L][M] (GelfandShilov), and D[M]. Here E, F, G are convenient vector spaces (finite dimensional in the cases of W∞,p, D, W[M],p, and D[M]), and M=(Mk) is a weakly log-convex weight sequence of moderate growth. As application we give a new simple proof of the fact that the groups of diffeomorphisms Diff B, Diff W∞,p, Diff S, and Diff D are C∞ Lie groups, and Diff B\M\, DiffW\M\,p, Diff S\L\\M\, and Diff D[M], for non-quasianalytic M, are C\M\ Lie groups, where Diff A = \Id +f : f ∈ A( Rn, Rn), ∈fx ∈ Rn ( In+ df(x))>0\. We also discuss stability under composition.