Decay rate to the planar viscous shock wave for multi-dimensional scalar conservation laws

Abstract

In this paper, we study the time-decay rate toward the planar viscous shock wave for multi-dimensional (m-d) scalar viscous conservation law. We first decompose the perturbation into zero and non-zero mode, and then introduce the anti-derivative of the zero mode. Though an Lp estimate and the area inequality introduced in DHS2020, we obtained the decay rate for planar shock wave for n-d scalar viscous conservation law for all n≥1. The initial perturbations we studied are small, i.e., \|0\|H2\|0\|Lp , where 0 is the anti-derivative of the zero mode of initial perturbation and is a small constant, see antiderivative. It is noted that there is no additional requirement on 0, i.e., 0(x1) only belongs to H2(). Thus, there are essential differences from previous results, in which the initial data is required to belong to some weighted Sobolev space, cf.Goo1989,KM1985. Moreover, the exponential decay rate of the non-zero mode is also obtained.

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