Multiple blow-up rates in a coupled heat system with mixed-type nonlinearities

The paper deals with the blow-up rate of positive solutions to the system l 11 l 12 l 21 l 22 Ž . u s u q u ¨, ¨s ¨q u ¨with boundary conditions u 1, t s t x x t x x x Ž p 11 p 12 .Ž . Ž . Ž p 21 p 22 .Ž . u ¨1, t and ¨1, t s u ¨1, t . Under some assumptions on the x Ž . Ž . Ž . matrices L s l and

## Abstract In this paper, we study a system of heat equations $u\_t=\Delta u, \, v\_t=\Delta v\,{\rm in}\,\Omega\times(0,T)$ coupled __via__ nonlinear boundary conditions Here __p__, __q__>0. We prove that the solutions always blow up in finite time for non‐trivial and non‐negative initial value

Under some natural hypothesis on the matrix P"(p GH ) that guarrantee the blow-up of the solution at time ¹, and some assumptions of the initial data u G , we find that if "" x """1 then u G (x , t)goestoinfinitylike(¹!t) G /2 , where the G (0 are the solutions of (P!Id) ( , )R"(!1, !1)R. As a corol