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Stability of planar rarefaction waves for scalar viscous conservation law under periodic perturbations

Feimin Huang, Qian Yuan

2021Methods and Applications of Analysis15 citationsDOI

Abstract

The large time behavior of the solutions to a multi-dimensional viscous conservation law is considered in this paper. It is shown that the solution time-asymptotically tends to the planar rarefaction wave if the initial perturbations are multi-dimensional periodic. The time-decay rate is also obtained. Moreover, a Gagliardo-Nirenberg type inequality is established in the domain $ \mathbb R \times \mathbb T^{n-1} (n\geq2) $, where $\mathbb T^{n-1}$ is the $ n-1 $-dimensional torus.

Topics & Concepts

Conservation lawMathematicsPlanarTorusScalar (mathematics)Mathematical analysisRarefaction (ecology)Domain (mathematical analysis)Mathematical physicsGeometryEcologyComputer scienceBiologySpecies diversityComputer graphics (images)Navier-Stokes equation solutionsAdvanced Mathematical Physics ProblemsComputational Fluid Dynamics and Aerodynamics
Stability of planar rarefaction waves for scalar viscous conservation law under periodic perturbations | Litcius