中文

Stability of undercompressive shock profiles

偏微分方程分析 2007-05-23 v2 数学物理 math.MP

摘要

Using a simplified pointwise iteration scheme, we establish nonlinear phase-asymptotic orbital stability of large-amplitude Lax, undercompressive, overcompressive, and mixed under--overcompressive type shock profiles of strictly parabolic systems of conservation laws with respect to initial perturbations u0(x)E0(1+x)3/2|u_0(x)|\le E_0 (1+|x|)^{-3/2} in C0+αC^{0+\alpha}, E0E_0 sufficiently small, under the necessary conditions of spectral and hyperbolic stability together with transversality of the connecting profile. This completes the program initiated by Zumbrun and Howard in \cite{ZH}, extending to the general undercompressive case results obtained for Lax and overcompressive shock profiles in \cite{SzX}, \cite{L}, \cite{ZH}, \cite{Z.2}, \cite{Ra}, \cite{MZ.1}--\cite{MZ.5}, and for special undercompressive profiles in \cite{LZ.1}--\cite{LZ.2}, \cite{HZ}. In particular, together with spectral results of \cite{Z.6}, our results yield nonlinear stability of large-amplitude undercompressive phase-transitional profiles near equilibrium of Slemrod's model \cite{Sl.5} for van der Waal gas dynamics or elasticity with viscosity--capillarity.

关键词

引用

@article{arxiv.math/0408150,
  title  = {Stability of undercompressive shock profiles},
  author = {Peter Howard and Kevin Zumbrun},
  journal= {arXiv preprint arXiv:math/0408150},
  year   = {2007}
}

备注

Corrected typos, added brief remarks on physical models and applications