GlobalL∞Estimates for a Class of Reaction–Diffusion Systems

We show that weak L p dissipativity implies strong L dissipativity and therefore implies the existence of global attractors for a general class of reaction diffusion systems. This generalizes the results of Alikakos and Rothe. The results on positive steady states (especially for systems of three eq

We prove here global existence in time of classical solutions for reaction᎐diffusion systems with strong coupling in the diffusion and with natural structure conditions on the nonlinear reactive terms. This extends some similar results in the case of a diagonal diffusion-operator associated with non

This paper deals with the blowup estimates of positive solutions for a semilinear reaction diffusion system u t = u + u α v p , v t = v + u q v β , with null Dirichlet boundary conditions. The upper and lower bounds of blowup rates are obtained.

We obtain in this paper the global boundedness of solutions to a Fujita-type reaction-diffusion system. This global boundedness results from diffusion effect, homogeneous Dirichlet boundary value conditions and appropriate reactions.