Non-wandering points for autonomous/periodic parabolic equations on the circle

Abstract

We study the properties of non-wandering points of the following scalar reaction-diffusion equation on the circle S1, equation* ut=uxx+f(t,u,ux),\,\,t>0,\,x∈ S1=R/2π Z, equation* where f is independent of t or T-periodic in t. Assume that the equation admits a compact global attractor. It is proved that, any non-wandering point is a limit point of the system (that is, it is a point in some ω-limit set). More precisely, in the autonomous case, it is proved that any non-wandering point is either a fixed point or generates a rotating wave on the circle. In the periodic case, it is proved that any non-wandering point is a periodic point or generates a rotating wave on a torus. In particular, if f(t,u,-ux)=f(t,u,ux), then any non-wandering point is a fixed point in the autonomous case, and is a periodic point in the periodic case.