On time-dependent Besov vector fields and the regularity of their flows

Abstract

We show ODE-closedness for a large class of Besov spaces Bn,α,p(Rd,Rd), where n ≥ 1,~α ∈ (0,1],~p ∈ [1,∞]. ODE-closedness means that pointwise time-dependent Bn,α,p-vector fields u have unique flows u ∈ Id + Bn,α,p(Rd,Rd). The class of vector fields under consideration contains as a special case the class of Bochner integrable vector fields L1(I, Bn,α,p(Rd,Rd)). In addition, for n ≥ 2 and α < β, we show continuity of the flow mapping L1(I,Bn,β,p(Rd,Rd)) → C(I,Bn,α,p(Rd,Rd)), ~ u u-Id. We even get γ-H\"older continuity for any γ < β - α.