Orbital instability of periodic waves for scalar viscous balance laws

IF 1.1 3区 数学 Q1 MATHEMATICS Journal of Evolution Equations Pub Date : 2024-01-17 DOI:10.1007/s00028-023-00936-5
Enrique Álvarez, Jaime Angulo Pava, Ramón G. Plaza
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Abstract

The purpose of this paper is to prove that, for a large class of nonlinear evolution equations known as scalar viscous balance laws, the spectral (linear) instability condition of periodic traveling wave solutions implies their orbital (nonlinear) instability in appropriate periodic Sobolev spaces. The analysis is based on the well-posedness theory, the smoothness of the data-solution map, and an abstract result of instability of equilibria under nonlinear iterations. The resulting instability criterion is applied to two families of periodic waves. The first family consists of small amplitude waves with finite fundamental period which emerge from a local Hopf bifurcation around a critical value of the velocity. The second family comprises arbitrarily large period waves which arise from a homoclinic (global) bifurcation and tend to a limiting traveling pulse when their fundamental period tends to infinity. In the case of both families, the criterion is applied to conclude their orbital instability under the flow of the nonlinear viscous balance law in periodic Sobolev spaces with same period as the fundamental period of the wave.

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标量粘性平衡定律周期波的轨道不稳定性
本文旨在证明,对于被称为标量粘性平衡定律的一大类非线性演化方程,周期性行波解的频谱(线性)不稳定性条件意味着它们在适当的周期性索波列夫空间中的轨道(非线性)不稳定性。该分析以好拟理论、数据-解映射的平滑性以及非线性迭代下平衡点不稳定性的抽象结果为基础。由此得出的不稳定性准则适用于两个周期性波系。第一个系列由具有有限基本周期的小振幅波组成,这些波从速度临界值附近的局部霍普夫分岔中产生。第二个波系由任意大周期波组成,这些波产生于同室(全局)分岔,当其基本周期趋于无穷大时,趋向于极限行波。在这两个波系的情况下,应用该准则可得出结论:在周期与波的基本周期相同的周期性索波列夫空间中,在非线性粘性平衡定律的流动下,它们的轨道是不稳定的。
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来源期刊
CiteScore
2.30
自引率
7.10%
发文量
90
审稿时长
>12 weeks
期刊介绍: The Journal of Evolution Equations (JEE) publishes high-quality, peer-reviewed papers on equations dealing with time dependent systems and ranging from abstract theory to concrete applications. Research articles should contain new and important results. Survey articles on recent developments are also considered as important contributions to the field. Particular topics covered by the journal are: Linear and Nonlinear Semigroups Parabolic and Hyperbolic Partial Differential Equations Reaction Diffusion Equations Deterministic and Stochastic Control Systems Transport and Population Equations Volterra Equations Delay Equations Stochastic Processes and Dirichlet Forms Maximal Regularity and Functional Calculi Asymptotics and Qualitative Theory of Linear and Nonlinear Evolution Equations Evolution Equations in Mathematical Physics Elliptic Operators
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