Nonlinear Stability for Reaction-Diffusion Models

被引:0
作者
Mulone, G. [1 ]
机构
[1] Citta Univ Catania, Dipartimento Matemat & Informat, I-95125 Catania, Italy
来源
NEW TRENDS IN FLUID AND SOLID MODELS | 2010年
关键词
LYAPUNOV FUNCTIONS; BENARD-PROBLEM; SYSTEMS; CONVECTION; CONVERGENCE; COMPETITION; EQUATIONS; LOTKA;
D O I
10.1142/9789814293228_0011
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
Some linear and nonlinear stability results for constant solutions to reaction-diffusion models are presented. Optimal stability results with the reduction method (based on the classical theory of eigenvalues-eigenvectors) are recalled. Global stability has been obtained for the positive equilibria of two competition models and for the endemic state of an epidemic model with diffusion.
引用
收藏
页码:91 / 101
页数:11
相关论文
共 32 条
[21]   Necessary and sufficient conditions for nonlinear stability in the magnetic Benard problem [J].
Mulone, G ;
Rionero, S .
ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS, 2003, 166 (03) :197-218
[22]   The rotating Benard problem: new stability results for any Prandtl and Taylor numbers [J].
Mulone, G ;
Rionero, S .
CONTINUUM MECHANICS AND THERMODYNAMICS, 1997, 9 (06) :347-363
[23]  
MULONE G, 2008, NONLINEAR STAB UNPUB
[24]   Global asymptotic stability of Lotka-Volterra competition systems with diffusion and time delays [J].
Pao, CV .
NONLINEAR ANALYSIS-REAL WORLD APPLICATIONS, 2004, 5 (01) :91-104
[25]   Convergence and continuous dependence for the Brinkman-Forchheimer equations [J].
Payne, LE ;
Straughan, B .
STUDIES IN APPLIED MATHEMATICS, 1999, 102 (04) :419-439
[26]   Convergence of the equations for a Maxwell fluid [J].
Payne, LE ;
Straughan, B .
STUDIES IN APPLIED MATHEMATICS, 1999, 103 (03) :267-278
[27]   Decay bounds in a model for aggregation of microglia: application to Alzheimer's disease senile plaques [J].
Quinlan, RA ;
Straughan, B .
PROCEEDINGS OF THE ROYAL SOCIETY A-MATHEMATICAL PHYSICAL AND ENGINEERING SCIENCES, 2005, 461 (2061) :2887-2897
[28]   A rigorous reduction of the L2-stability of the solutions to a nonlinear binary reaction-diffusion system of PDE's to the stability of the solutions to a linear binary system of ODE's [J].
Rionero, S. .
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2006, 319 (02) :377-397
[29]   Sharp global nonlinear stability for temperature-dependent viscosity convection [J].
Straughan, B .
PROCEEDINGS OF THE ROYAL SOCIETY A-MATHEMATICAL PHYSICAL AND ENGINEERING SCIENCES, 2002, 458 (2023) :1773-1782
[30]   A sharp nonlinear stability threshold in rotating porous convection [J].
Straughan, B .
PROCEEDINGS OF THE ROYAL SOCIETY A-MATHEMATICAL PHYSICAL AND ENGINEERING SCIENCES, 2001, 457 (2005) :87-93
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