Lie groups of real analytic diffeomorphisms are L1-regular

Abstract

Let M be a compact, real analytic manifold and G be the Lie group of all real-analytic diffeomorphisms of M, which is modelled on the space g of real-analytic vector fields on M. We study flows of time-dependent real-analytic vector fields on M which are integrable functions in time, and their dependence on the time-dependent vector field. Notably, we show that the Lie group G is L1-regular in the sense that each [γ] in L1([0,1], g) has an evolution which is an absolutely continuous G-valued function on [0,1] and depends smoothly on [γ]. As tools for the proof, we develop new results concerning L1-regularity of infinite-dimensional Lie groups, and new results concerning the continuity and complex analyticity of non-linear mappings on locally convex direct limits.