Existence of periodic points near an isolated fixed point with Lefschetz index 1 and zero rotation for area preserving surface homeomorphisms

Abstract

Let f be an orientation and area preserving diffeomorphism of an oriented surface M with an isolated degenerate fixed point z0 with Lefschetz index one. Le Roux conjectured that z0 is accumulated by periodic orbits. In this article, we will approach Le Roux's conjecture by proving that if f is isotopic to the identity by an isotopy fixing z0 and if the area of M is finite, then z0 is accumulated not only by periodic points, but also by periodic orbits in the measure sense. More precisely, the Dirac measure at z0 is the limit in weak-star topology of a sequence of invariant probability measures supported on periodic orbits. Our proof is purely topological and will works for homeomorphisms and is related to the notion of local rotation set.