Title of article
Nonlinear stability of strong rarefaction waves for the generalized KdV–Burgers–Kuramoto equation with large initial perturbation Original Research Article
Author/Authors
Ran Duan، نويسنده , , Lili Fan، نويسنده , , Jongsung Kim، نويسنده , , Linqiao Xie، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
14
From page
3254
To page
3267
Abstract
In was shown in Ruan et al. (2008) [3] that rarefaction waves for the generalized KdV–Burgers–Kuramoto equation are nonlinearly stable provided that both the strength of the rarefaction waves and the initial perturbation are sufficiently small. The main purpose of this work is concerned with nonlinear stability of strong rarefaction waves for the generalized KdV–Burgers–Kuramoto equation with large initial perturbation. In our results, we do not require the strength of the rarefaction waves to be small and when the smooth nonlinear flux function satisfies certain growth condition at infinity, the initial perturbation can be chosen arbitrarily in View the MathML sourceH1(R), while for a general smooth nonlinear flux function, we need to ask for the L2L2-norm of the initial perturbation to be small but the L2L2-norm of the first derivative of the initial perturbation can be large and, consequently, the View the MathML sourceH1(R)-norm of the initial perturbation can also be large.
Keywords
Global stability , Continuation argument , Generalized KdV–Burgers–Kuramoto equation , Strong rarefaction waves
Journal title
Nonlinear Analysis Theory, Methods & Applications
Serial Year
2010
Journal title
Nonlinear Analysis Theory, Methods & Applications
Record number
862763
Link To Document