Global Existence of Entropy-Weak Solutions to the Compressible Navier-Stokes Equations with Non-Linear Density Dependent Viscosities

Abstract

In this paper, we extend considerably the global existence results of entropy-weak solutions related to compressible Navier-Stokes system with density dependent viscosities obtained, independently (using different strategies), by Vasseur-Yu [Inventiones mathematicae (2016) and arXiv:1501.06803 (2015)] and by Li-Xin [arXiv:1504.06826 (2015)].More precisely we are able to consider a physical symmetric viscous stress tensor σ=2μ()\,D(u)+(λ() divu -P())\, Id where D(u) = [∇ u + ∇T u]/2 with a shear and bulk viscosities (respectively μ() and λ()) satisfying the BD relation λ()=2(μ'() - μ()) and a pressure law P()=aγ (with a>0 a given constant) for any adiabatic constant γ>1. The nonlinear shear viscosity μ() satisfies some lower and upper bounds for low and high densities (our mathematical result includes the case μ()= μα with 2/3 < α < 4 and μ>0 constant). This provides an answer to a longstanding mathematical question on compressible Navier-Stokes equations with density dependent viscosities as mentioned for instance by F. Rousset in the Bourbaki 69\`eme ann\'ee, 2016--2017, no 1135.