Classification of global attractors for S1-equivariant parabolic equations: a survey

Abstract

We survey the global dynamics of semiflows generated by scalar semilinear parabolic equations which are SO(2) equivariant under spatial shifts of x∈ S1=R/2πZ, i.e. ut = uxx + f(u,ux), x∈ S1. For dissipative C2 nonlinearities f, the semiflow possesses a compact global attractor A=AP which we call Sturm attractor. The Sturm attractor AP decomposes as AP=EPPP, where HP denotes heteroclinic orbits between distinct elements of spatially homogeneous equilibria E, rigidly rotating waves RP and, as their non-rotating counterparts, frozen waves FP. We therefore represent AP by its connection graph CP, with vertices in E,FP,RP and edges HP. Under mild hyperbolicity assumptions, the directed graphs CP are finite and transitive. For illustration, we enumerate all 21 connection graphs CP with up to seven vertices. The result uses a lap signature of period maps associated to integrable versions of the steady state ODE of our PDE. As an example, we freeze and reconstruct the connection graph of the Vas tulip attractor, known from delay differential equations, in our PDE setting.