Existence of a positive hyperbolic Reeb orbit in three spheres with finite free group actions

Abstract

Let (Y,λ) be a non-degenerate contact three manifold. D. Cristfaro-Gardiner, M. Hutshings and D. Pomerleano showed that if c1(=Kerλ) is torsion, then the Reeb vector field of (Y,λ) has infinity many Reeb orbits otherwise (Y,λ) is a lens space or three sphere with exaxtly two simple elliptic orbits. In the same paper, they also showed that if b1(Y)>0, (Y,λ) has a simple positive hyperbolic orbit directly from the isomorhphism between Seiberg-Witten Floer homology and Embedded contact homology. In addition to this, they asked whether (Y,λ) with infinity many simple orbits also has a positive hyperbolic orbit under b1(Y)=0. In the present paper, we answer this question under Y S3 with nontrivial finite free group actions, especially lens spaces (L(p,q),λ) with odd p as quotient spaces of S3.