The existence and stability of traveling waves with transition layers for the S-K-T competition model with cross-diffusion

被引:0
作者
YaPing Wu
Ye Zhao
机构
[1] Capital Normal University,Department of Mathematics
[2] Beijing Institute of Petrochemical Technology,Department of Mathematics and Physics
来源
Science China Mathematics | 2010年 / 53卷
关键词
traveling waves; existence; stability; cross-diffusion; spectral analysis; unstable bundle; 35B25; 35B35; 35K45; 35K55; 47A75;
D O I
暂无
中图分类号
学科分类号
摘要
This paper is concerned with the existence and stability of traveling waves with transition layers for a quasi-linear competition system with cross diffusion, which was first proposed by Shegesada, Kawasaki and Teramoto. When one of the random diffusion rates is small and the cross-diffusion rate is not small, by the geometric singular perturbation method, the existence of traveling waves with transition layers is obtained. Further, by the detailed spectral analysis and topological index method, the traveling waves with transition layers are proved to be locally exponentially stable with shift.
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页码:1161 / 1184
页数:23
相关论文
共 44 条
  • [1] Alexander J.(1990)A topological invariant arising in the stability analysis of traveling waves J Reine Angew Math 410 167-212
  • [2] Gardner R. A.(1990)Dynamic theory of quasilinear parabolic equations, II. reaction-diffusion systems Differential Integral Equations 3 13-75
  • [3] Jones C. K. R. T.(2003)Existence of traveling waves with their minimal speed for a diffusing Lotka-Volterra system Nonlinear Anal Real World Appl 4 503-524
  • [4] Amann H.(1982)Existence and stability of traveling wave solutions of competition model: a degree theoretical approach J Differential Equations 44 343-364
  • [5] Fei N.(1991)Stability of traveling wave solutions of diffusion predator-prey system Trans Amer Math Soc 327 465-524
  • [6] Carr J.(1991)Singular pertubation approach to traveling waves in competing and diffusion species models J Math Kyoto Univ 22 435-461
  • [7] Gardner R. A.(2003)Traveling waves for a diffusive Lotka-Volterra competition model I - singular perturbation approach Discrete Contin Dyn Syst Ser B 3 79-95
  • [8] Gardner R. A.(1996)Existence of wave front solutions and estimates of wave speed for a competition-diffusion system Nonlinear Anal 27 579-587
  • [9] Jones C. K. R. T.(1997)Fisher wave fronts for the Lotka-Volterra competition model with diffusion Nonlinear Anal 28 145-164
  • [10] Hosomo Y.(1995)Parameter dependence of propagating speed of traveling waves for competition-diffusion equation SIAM J Math Anal 26 340-363
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