Abstract
We prove that the steady states of a class of multidimensional reaction–diffusion systems are asymptotically stable at the intersection of unweighted space and exponentially weighted Sobolev spaces, paying particular attention to a special case, namely, systems of equations that arise in combustion theory. The steady-state solutions considered here are the end states of the planar fronts associated with these systems. The present work can be seen as a complement to the previous results on the stability of multidimensional planar fronts.
Funder
National Natural Science Foundation of China
Xi’an Jiaotong-Liverpool University
National Science Foundation
Subject
Energy (miscellaneous),Energy Engineering and Power Technology,Renewable Energy, Sustainability and the Environment,Electrical and Electronic Engineering,Control and Optimization,Engineering (miscellaneous),Building and Construction
Reference22 articles.
1. The Mathematical Theory of Combustion and Explosions;Zel’dovich,1985
2. Traveling Wave Solutions of Parabolic Systems, Translations of Mathematical Monographs;Volpert,1994
3. Traneling front solutions of semilinear equations in n dimensions;Berestycki,1991
4. Stability of travelling waves;Sandstede,2002
5. Essential instabilities of fronts: bifurcation, and bifurcation failure
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