DocumentCode
3277434
Title
On spatially uniform behavior in reaction-diffusion systems
Author
Arcak, M.
Author_Institution
Dept. of Electr. Eng. & Comput. Sci., Univ. of California, Berkeley, CA, USA
fYear
2010
fDate
June 30 2010-July 2 2010
Firstpage
2587
Lastpage
2592
Abstract
We present a condition which guarantees spatial uniformity for the asymptotic behavior of the solutions of a reaction-diffusion PDE with Neumann boundary conditions. This condition makes use of the Jacobian matrix of the reaction terms and the second Neumann eigenvalue of the Laplacian operator on the given spatial domain, and replaces the global Lipschitz assumptions commonly used in the literature with a less restrictive Lyapunov inequality. We then present numerical procedures for the verification of this Lyapunov inequality and illustrate them on models of several biochemical reaction networks.
Keywords
partial differential equations; reaction-diffusion systems; Jacobian matrix; Laplacian operator; Lyapunov inequality; Neumann boundary conditions; Neumann eigenvalue; asymptotic behavior; biochemical reaction networks; global Lipschitz assumptions; partial differential equations; reaction-diffusion systems; Biological cells; Biological system modeling; Boundary conditions; Control systems; Eigenvalues and eigenfunctions; Jacobian matrices; Laplace equations; Linear matrix inequalities; Stability; Testing;
fLanguage
English
Publisher
ieee
Conference_Titel
American Control Conference (ACC), 2010
Conference_Location
Baltimore, MD
ISSN
0743-1619
Print_ISBN
978-1-4244-7426-4
Type
conf
DOI
10.1109/ACC.2010.5530549
Filename
5530549
Link To Document