Porous medium equation with absorption and a nonlinear boundary condition

This article deals with the global solutions and blow-up problems for the Ž m . Ž .Ž n . Ž . convective porous medium equation u s u q rn u , x g 0, 1 , t ) 0, Ž m . Ž . p Ž . Ž m . Ž . with the nonlinear boundary conditions y u 0, t s au 0, t , u 1, t s 0, w x and positive initial data u x, 0 s u

We consider a semilinear parabolic equation subject to a nonlinear dynamical boundary condition that is related to the so-called Wentzell boundary condition. First we prove the existence and uniqueness of global solutions as well as the existence of a global attractor. Then we derive a suitable Łoja

The problem under investigation is the heat equation in the upper half-plane, to which the diffusion in the longitudinal direction has been suppressed, and augmented with a nonlinear oblique derivative condition. This paper proves global existence and qualitative properties to the Cauchy problem for