The Convenient Setting for non-Quasianalytic Denjoy--Carleman Differentiable Mappings

Abstract

For Denjoy--Carleman differential function classes CM where the weight sequence M=(Mk) is logarithmically convex, stable under derivations, and non-quasianalytic of moderate growth, we prove the following: A mapping is CM if it maps CM-curves to CM-curves. The category of CM-mappings is cartesian closed in the sense that CM(E,CM(F,G)) CM(E F, G) for convenient vector spaces. Applications to manifolds of mappings are given: The group of CM-diffeomorphisms is a CM-Lie group but not better.