Asymptotic stability of planar rarefaction waves for 3-d isentropic Navier-Stokes equations under periodic perturbations

Abstract

We study the asymptotic stability of a planar rarefaction wave (in the x1 - direction) for the 3-d isentropic Navier-Stokes equations, where the initial perturbation is periodic on the torus T3 with zero average. To solve this Cauchy problem in which the initial data is periodic with respect to only x2 and x3 but not to x1, we construct a suitable ansatz carrying the oscillations of the solution in the x1 - direction, but remaining to be periodic in the transverse x2 - and x3 - directions. In such a way, the difference between the ansatz and the solution can be integrable on the region R×T2, which allows us to utilize the energy method with the aid of a Gagliardo-Nirenberg type inequality on R×T2 to prove the result.