Global existence and blow-up for a quasilinear degenerate parabolic system in a cylinder

This paper deals with a class of nonlinear parabolic problems in divergence form whose solutions, without appropriate data restrictions, might blow up at some finite time. The purpose of this paper is to establish conditions on the data sufficient to guarantee blow-up of solution at some finite time

This paper investigates the blow-up and global existence of solutions of the degenerate reactiondiffusion system with homogeneous Dirichlet boundary data, where ⊂ R N is a bounded domain with smooth boundary \* , m, n > 1, , 0 and p, q > 0. It is proved that if m > , n > and pq < (m -)(n -) every n

## Abstract In this paper the degenerate parabolic system __u__~__t__~=__u__(__u__~__xx__~+__av__). __vt__=__v__(__v__~__xx__~+__bu__) with Dirichlet boundary condition is studied. For $a. b {<} \lambda\_{1} (\sqrt {ab} {<} \lambda\_{1} {\rm if}\, \alpha\_{1} {\neq} \alpha\_{2})$, the global existe

In this paper, we investigate the positive solution of nonlinear degenerate equation ut = u p ( u+au u q d x) with Dirichlet boundary condition. Conditions on the existence of global and blow-up solution are given. Furthermore, it is proved that there exist two positive constants C1; C2 such that