The well-posedness issue in endpoint spaces for an inviscid low-Mach number limit system

Abstract

The present paper is devoted to the well-posedness issue for a low-Mach number limit system with heat conduction but no viscosity. We will work in the framework of general Besov spaces Bsp,r(d), d≥ 2, which can be embedded into the class of Lipschitz functions. Firstly, we consider the case of p∈[2,4], with no further restrictions on the initial data. Then we tackle the case of any p∈\,]1,∞], but requiring also a finite energy assumption. The extreme value p=∞ can be treated due to a new a priori estimate for parabolic equations. At last we also briefly consider the case of any p∈ ]1,∞[ but with smallness condition on initial inhomogeneity. A continuation criterion and a lower bound for the lifespan of the solution are proved as well. In particular in dimension 2, the lower bound goes to infinity as the initial density tends to a constant.