The Regularity Problem for Lie Groups with Asymptotic Estimate Lie Algebras

Abstract

We solve the regularity problem for Milnor's infinite dimensional Lie groups in the asymptotic estimate context. Specifically, let G be a Lie group with asymptotic estimate Lie algebra g, and denote its evolution map by evol D dom[evol]→ G, i.e., D⊂eq C0([0,1],g). We show that evol is C∞-continuous on D C∞([0,1],g) if and only if evol is C0-continuous on D C0([0,1],g). We furthermore show that G is k-confined for k∈ N\lip,∞\ if G is constricted. (The latter condition is slightly less restrictive than to be asymptotic estimate.) Results obtained in a previous paper then imply that an asymptotic estimate Lie group G is C∞-regular if and only if it is Mackey complete, locally μ-convex, and has Mackey complete Lie algebra - In this case, G is Ck-regular for each k∈ N≥ 1\lip,∞\ (with ``smoothness restrictions'' for k), as well as C0-regular if G is even sequentially complete with integral complete Lie algebra.