Asymptotic Behavior of Solutions of a Degenerate Diffusion Equation with a Multistable Reaction

Abstract

We consider a generalized degenerate diffusion equation with a reaction term ut=[A(u)]xx+f(u), where A is a smooth function satisfying A(0)=A'(0)=0 and A(u),\ A'(u),\ A''(u)>0 for u>0, f is of monostable type in [0,s1] and of bistable type in [s1,1]. We first give a trichotomy result on the asymptotic behavior of the solutions starting at compactly supported initial data, which says that, as t ∞, either small-spreading (which means u tends to s1), or transition, or big-spreading (which means u tends to 1) happens for a solution. Then we construct the classical and sharp traveling waves (a sharp wave means a wave having a free boundary which satisfies the Darcy's law) for the generalized degenerate diffusion equation, and then using them to characterize the spreading solution near its front.