Exponential laws for weighted function spaces and regularity of weighted mapping groups

Abstract

Let E be a locally convex space, U⊂eqRn as well as V⊂eqRm be open and k,l∈N0\∞\. Locally convex spaces Ck,l(U× V,E) of functions with different degrees of differentiability in the U- and V-variable were recently studied by H.Alzaareer, who established an exponential law of the form Ck,l(U× V,E) Ck(U,Cl(V,E)). We establish an analogous exponential law Ck,lW12(U× V,E) CkW1(U,ClW2(V,E)) for suitable spaces of weighted Ck,l-maps, as well as an analogue for spaces of weighted continuous functions on locally compact spaces. The results entail that certain Lie groups ClW(U,H) of weighted mappings introduced by B.Walter are Ck-regular, for each Ck-regular Lie group H modeled on a locally convex space and a suitable set of weights W.