The Morse Smale property for time-periodic scalar reaction-diffusion equation on the circle

Abstract

abstract We study the Morse-Smale property for the following scalar semilinear parabolic equation on the circle S1, equation* ut=uxx+f(t,u,ux),\,\,t>0,\,x∈ S1=R/2π Z, equation* where f is a C2 function and T-periodic in t. Assume that the equation admits a compact global attractor A and let P be the Poincar\'e map of this equation. We exclude homoclinic connection for hyperbolic fixed points of P and prove that stable and unstable manifolds for any two heteroclinic hyperbolic fixed points of P intersect transversely. Further, this equation admits the Morse-Smale property provided that all ω-limit sets (in the case f(t,u,ux)=f(t,u,-ux), the ω-limit set is just a fixed point) of the corresponding Poincar\'e map are hyperbolic. abstract