Analysis of an inviscid zero-Mach number system in endpoint Besov spaces with finite-energy initial data

Abstract

The present paper is the continuation of work [14], devoted to the study of an inviscid zero-Mach number system in the framework of endpoint Besov spaces of type Bs∞,r(Rd), r∈ [1,∞], d≥ 2, which can be embedded in the Lipschitz class C0,1. In particular, the largest case B1∞,1 and the case of H\"older spaces C1,α are permitted. The local in time well-posedness result is proved, under an additional L2 hypothesis on the initial inhomogeneity and velocity field. A new a priori estimate for parabolic equations in endpoint spaces Bs∞,r is presented, which is the key to the proof. In dimension two, we are able to give a lower bound for the lifespan, such that the solutions tend to be globally defined when the initial inhomogeneity is small. There we will show a refined a priori estimate in endpoint Besov spaces for transport equations with non solenoidal transport velocity field.