Optimal rate of convergence in Stratified Boussinesq system

Abstract

We study the vortex patch problem for 2d-stratified Navier-Stokes system. We aim at extending several results obtained in ad,danchinpoche,hmidipoche for standard Euler and Navier-Stokes systems. We shall deal with smooth initial patches and establish global strong estimates uniformly with respect to the viscosity in the spirit of HZ-poche, Z-poche. This allows to prove the convergence of the viscous solutions towards the inviscid one. In the setting of a Rankine vortex, we show that the rate of convergence for the vortices is optimal in Lp space and is given by (μ t)12p. This generalizes the result of ad obtained for L2 space.