Threshold Behavior and Non-quasiconvergent Solutions with Localized Initial Data for Bistable Reaction-Diffusion Equations

摘要

We consider bounded solutions of the semilinear heat equation on , where is of the unbalanced bistable type. We examine the -limit sets of bounded solutions with respect to the locally uniform convergence. Our goal is to show that even for solutions whose initial data vanish at , the -limit sets may contain functions which are not steady states. Previously, such examples were known for balanced bistable nonlinearities. The novelty of the present result is that it applies to a robust class of nonlinearities. Our proof is based on an analysis of threshold solutions for ordered families of initial data whose limits at infinity are not necessarily zeros of f.