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Main Authors: Blochas, Paul, Cheng, Jeffrey
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2501.01537
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author Blochas, Paul
Cheng, Jeffrey
author_facet Blochas, Paul
Cheng, Jeffrey
contents The recent theory of $a-$contraction with shifts provides $L^2$-stability for shock waves of $1-$D hyperbolic systems of conservation laws. The theory has been established at the inviscid level uniformly in the shock amplitude, and at the viscous level for small shocks. In this work, we investigate whether the $a-$contraction property holds uniformly in the shock amplitude for some specific systems with viscosity. We show that in some cases, the $a-$contraction fails for sufficiently large shocks. This showcases a "viscous destabilization" effect in the sense that the $a$-contraction property is verified for the inviscid model, but can fail for the viscous one. This also shows that the $a$-contraction property, even among small perturbations, is stronger than the classical notion of nonlinear stability, which is known to hold regardless of shock amplitude for viscous scalar conservation laws.
format Preprint
id arxiv_https___arxiv_org_abs_2501_01537
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Viscous Destabilization for Large Shocks of Conservation Laws
Blochas, Paul
Cheng, Jeffrey
Analysis of PDEs
The recent theory of $a-$contraction with shifts provides $L^2$-stability for shock waves of $1-$D hyperbolic systems of conservation laws. The theory has been established at the inviscid level uniformly in the shock amplitude, and at the viscous level for small shocks. In this work, we investigate whether the $a-$contraction property holds uniformly in the shock amplitude for some specific systems with viscosity. We show that in some cases, the $a-$contraction fails for sufficiently large shocks. This showcases a "viscous destabilization" effect in the sense that the $a$-contraction property is verified for the inviscid model, but can fail for the viscous one. This also shows that the $a$-contraction property, even among small perturbations, is stronger than the classical notion of nonlinear stability, which is known to hold regardless of shock amplitude for viscous scalar conservation laws.
title Viscous Destabilization for Large Shocks of Conservation Laws
topic Analysis of PDEs
url https://arxiv.org/abs/2501.01537