Polycycle omega-limit sets of flows on the compact Riemann surfaces and Eulerian path

Abstract

Let (S,) be a pair of a closed oriented surface and be a real analytic flow with finitely many singularities. Let x be a point of S with the polycycle ω-limit set ω(x). In this paper we give topological classification of ω(x). Our main theorem says that ω(x) is diffeomorphic to the boundary of a cactus in the 2-sphere S2. Moreover S is a connected sum of the above S2 and a closed oriented surface along finitely many embedded circles which are disjoint from ω(x). This gives a natural generalization to the higher genus of the main result of JL for the genus 0 case. Our result is further applicable to a larger class of surface flows, a compact oriented surface with corner and a C1-flow with finitely many singularities locally diffeomorphic to an analytic flow.