Instability of Equilibria in Some Delay Reaction-Diffusion Systems

For a stable matrix A with real entries, sufficient and necessary conditions for A y D to be stable for all non-negative diagonal matrices D are obtained. Implications of these conditions for the stability and instability of constant steadystate solutions to reaction᎐diffusion systems are discussed

In this work, we are concerned with the monotonicity and the stability study for quasi-monotone reaction-diffusion systems with delay and subject to Dirichlet boundary conditions. We first establish some invariance and comparison results for abstract retarded functional differential equations with n

Both uniform persistence and global extinction are established for two species predator prey and competition reaction diffusion systems with delays in terms of the principal eigenvalues of the scalar elliptic eigenvalue problems by appealing to the theories of abstract persistence, asymptotically au