Asymptotic behavior of semilinear parabolic equations on the circle with time almost-periodic/recurrent dependence

Abstract

We study topological structure of the ω-limit sets of the skew-product semiflow generated by the following scalar reaction-diffusion equation equation* ut=uxx+f(t,u,ux),\,\,t>0,\,x∈ S1=R/2π Z, equation* where f(t,u,ux) is C2-admissible with time-recurrent structure including almost-periodicity and almost-automorphy. Contrary to the time-periodic cases (for which any ω-limit set can be imbedded into a periodically forced circle flow), it is shown that one cannot expect that any ω-limit set can be imbedded into an almost-periodically forced circle flow even if f is uniformly almost-periodic in t. More precisely, we prove that, for a given ω-limit set , if dimVc()≤ 1 (Vc() is the center space associated with ), then is either spatially-homogeneous or spatially-inhomogeneous; and moreover, any spatially-inhomogeneous can be imbedded into a time-recurrently forced circle flow (resp. imbedded into an almost periodically-forced circle flow if f is uniformly almost-periodic in t). On the other hand, when dimVc(>1, it is pointed out that the above embedding property cannot hold anymore. Furthermore, we also show the new phenomena of the residual imbedding into a time-recurrently forced circle flow (resp. into an almost automorphically-forced circle flow if f is uniformly almost-periodic in t) provided that Vc()=2 and Vu() is odd. All these results reveal that for such system there are essential differences between time-periodic cases and non-periodic cases.