Self-intersecting curves on a pair of pants and periodic orbits of Hamiltonian flows

Abstract

The character variety X(S,G) associated to an oriented compact surface S with boundary and a real reductive Lie group G admits a Poisson structure and is foliated by symplectic leaves. When G is a matrix group, any closed curve c∈π1(S) induces a trace function trc[] tr((c)) on X(S,G). In this article, we study the Hamiltonian flows of trace functions associated to self-intersecting curves. We prove that when G=PSL(3,R) and S is the pair of pants, every orbit of the Hamiltonian flow of the trace of a figure eight curve on S is periodic and has a unique fixed point. The proof uses explicit computations in Fock-Goncharov coordinates. As an application, we prove a similar statement for the trace of the -web. Finally, we focus on the symplectic leaf corresponding to the unipotent locus, and derive similar results for two more self-intersecting curves: the commutator, and a curve going k times around a boundary component.