Manifolds of mappings on cartesian products

Abstract

Given smooth manifolds M1,…, Mn (which may have a boundary or corners), a smooth manifold N modeled on locally convex spaces and α∈( N0\∞\)n, we consider the set Cα(M1×·s× Mn,N) of all mappings f M1×·s× Mn N which are Cα in the sense of Alzaareer. Such mappings admit, simultaneously, continuous iterated directional derivatives of orders ≤ αj in the jth variable for j∈\1,…, n\, in local charts. We show that Cα(M1×·s× Mn,N) admits a canonical smooth manifold structure whenever each Mj is compact and N admits a local addition. The case of non-compact domains is also considered.