Stability criteria for reaction-diffusion systems with skew-gradient structure

被引:19
|
作者
Chen, Chao-Nien [1 ]
Hu, Xijun [2 ]
机构
[1] Natl Changhua Univ Educ, Dept Math, Changhua, Taiwan
[2] Chinese Acad Sci, AMSS, Inst Math, Beijing, Peoples R China
来源
COMMUNICATIONS IN PARTIAL DIFFERENTIAL EQUATIONS | 2008年 / 33卷 / 02期
关键词
reaction-diffusion system; relative Morse index; skew-gradient structure; stability;
D O I
10.1080/03605300601188755
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
This paper deals with reaction-diffusion systems with skew-gradient structure. In connection with calculus of variations, we show that there is a close relation between the stability of a steady state and its relative Morse index. The stability criteria presented here were partially motivated by some recent works of Yanagida.
引用
收藏
页码:189 / 208
页数:20
相关论文
共 50 条
  • [31] GLOBAL STABILITY OF STATIONARY SOLUTIONS OF REACTION-DIFFUSION SYSTEMS
    GARDNER, RA
    JOURNAL OF DIFFERENTIAL EQUATIONS, 1980, 37 (01) : 60 - 69
  • [32] Reaction-diffusion systems with temperature feedback: Bifurcations and stability
    Leung, AW
    NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 1997, 30 (06) : 3379 - 3390
  • [33] STABILITY PROPERTIES OF SOLUTIONS TO SYSTEMS OF REACTION-DIFFUSION EQUATIONS
    CASTEN, RG
    HOLLAND, CJ
    SIAM JOURNAL ON APPLIED MATHEMATICS, 1977, 33 (02) : 353 - 364
  • [34] COEXISTENCE AND STABILITY OF SOLUTIONS FOR A CLASS OF REACTION-DIFFUSION SYSTEMS
    Zhang, Zhenbu
    ELECTRONIC JOURNAL OF DIFFERENTIAL EQUATIONS, 2005,
  • [35] Instability of pukes in gradient reaction-diffusion systems: a symplectic approach
    Beck, M.
    Cox, G.
    Jones, C.
    Latushkin, Y.
    McQuighan, K.
    Sukhtayev, A.
    PHILOSOPHICAL TRANSACTIONS OF THE ROYAL SOCIETY A-MATHEMATICAL PHYSICAL AND ENGINEERING SCIENCES, 2018, 376 (2117):
  • [36] Uniform stability of delayed impulsive reaction-diffusion systems
    Suriguga, Ma
    Kao, Yonggui
    Hyder, Abd-Allah
    APPLIED MATHEMATICS AND COMPUTATION, 2020, 372
  • [37] STABILITY OF A PLANAR FRONT IN A CLASS OF REACTION-DIFFUSION SYSTEMS
    Ghazaryan, A.
    Latushkin, Y.
    Yang, X.
    SIAM JOURNAL ON MATHEMATICAL ANALYSIS, 2018, 50 (05) : 5569 - 5615
  • [38] Reaction-diffusion systems with temperature feedback: Bifurcations and stability
    Department of Mathematical Sciences, University of Cincinnati, Cincinnati, OH 45221-0025, United States
    Nonlinear Anal Theory Methods Appl, 6 (3379-3390):
  • [39] Linear stability criteria in a reaction-diffusion equation with spatially inhomogeneous delay
    Schley, D
    Gourley, SA
    DYNAMICS AND STABILITY OF SYSTEMS, 1999, 14 (01): : 71 - 91
  • [40] CROSS-DIFFUSION INDUCED INSTABILITY AND STABILITY IN REACTION-DIFFUSION SYSTEMS
    Shi, Junping
    Xie, Zhifu
    Little, Kristina
    JOURNAL OF APPLIED ANALYSIS AND COMPUTATION, 2011, 1 (01): : 95 - 119
12345