Blow-up rate estimates for a doubly coupled reaction–diffusion system

## Abstract In this paper, some sufficient conditions under which the quasilinear elliptic system ‐div(∣∇__~u~__∣__^p‐2^__∇__~u~__) = __u____v__, ‐div(∣∇__~u~__∣__^q‐2^__∇__~u~__) = __u____v__ in ℝ^N^(__N__≥3) has no radially symmetric positive solution is derived. Then by using this non‐existence

This paper deals with the blow-up rate of positive solution to semilinear reaction diffusion system: (Ul)t = AUl "~-uPl,..-, (Un-1)t -~ AUn-1 "~ UPn n-1 , (Un)t : AUn -~-U p'L , with null Dirichlet boundary conditions. The upper and lower bounds of blow-up rate were obtained. (~) 2002 Elsevier Scien

This work deals with a semilinear parabolic system which is coupled both in the equations and in the boundary conditions. The blow-up phenomena of its positive solutions are studied using the scaling method, the Green function and Schauder estimates. The upper and lower bounds of blow-up rates are t

This paper deals with interactions among three kinds of nonlinear mechanisms: nonlinear di usion, nonlinear reaction and nonlinear boundary ux in a parabolic model with multiple nonlinearities. The necessary and su cient blow-up conditions are established together with blow-up rate estimates for the