A semilinear parabolic system with coupling variable exponents

In this paper, we consider the system q 1 1 0 0 and bounded. We prove that if pq F 1 every nonnegative solution is global. When Ž . Ž . Ž . Ž . pq ) 1 we let ␣ s p q 2 r2 pq y 1 , ␤ s 2 q q 1 r2 pq y 1 . We show that if Ž . Ž . max ␣, ␤ ) Nr2 or max ␣, ␤ s Nr2 and p, q G 1, then all nontrivial nonne

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

We consider a semilinear parabolic coupled system in R n × R+ where the maximum principle and the minimum principle fail for the solution itself and also for its ÿrst derivatives with respect to x. Under the assumption that f and g present a subquadratic growth near the origin, we prove the global

We study solutions to the Cauchy problem for a semilinear parabolic equation with a nonlinearity which is critical in the sense of Joseph and Lundgren and establish the rate of convergence to regular steady states. In the critical case, this rate contains a logarithmic term which does not appear in