Nonlinear Convection in Reaction-diffusion Equations under dynamical boundary conditions

Abstract

We investigate blow-up phenomena for positive solutions of nonlinear reaction-diffusion equations including a nonlinear convection term ∂t u = u - g(u) · ∇ u + f(u) in a bounded domain of RN under the dissipative dynamical boundary conditions σ ∂t u + ∂ u =0. Some conditions on g and f are discussed to state if the positive solutions blow up in finite time or not. Moreover, for certain classes of nonlinearities, an upper-bound for the blow-up time can be derived and the blow-up rate can be determinated.