Exponential laws for spaces of differentiable functions on topological groups

Abstract

Smooth functions f:G E from a topological group G to a locally convex space E were considered by Riss (1953), Boseck, Czichowski and Rudolph (1981), Beltita and Nicolae (2015), and others, in varying degrees of generality. The space C∞(G,E) of such functions carries a natural topology, the compact-open C∞-topology. For topological groups G and H, we show that C∞(G× H,E) C∞(G,C∞(H,E)) as a locally convex space, whenever both G and H are metrizable or both G and H are locally compact. Likewise, Ck(G, Cl(H,E)) can be identified with a suitable space of functions on G× H.