Manifolds of absolutely continuous functions with values in an infinite-dimensional manifold and regularity properties of half-Lie groups

Abstract

For p∈ [1,∞], we define a smooth manifold structure on the set ACLp([a,b],N) of absolutely continuous functions γ [a,b] N with Lp-derivatives for all real numbers a<b and each smooth manifold N modeled on a sequentially complete locally convex topological vector space, such that N admits a local addition. Smoothness of natural mappings between spaces of absolutely continuous functions is discussed, like superposition operators ACLp([a,b],N1) ACLp([a,b],N2), η f η, for a smooth map f N1 N2. For 1≤ p <∞ and r∈ N we show that the right half-Lie groups DiffKr(R) and Diffr(M) are Lp-semiregular. Here K is a compact subset of R and M is a compact smooth manifold. An Lp-semiregular half-Lie group G admits an evolution map Evol:Lp([0,1],Te G) ACLp([0,1],G), where e is the neutral element of G. For the preceding examples, the evolution map Evol is continuous.