Non-contractible periodic orbits, Gromov invariants, and Floer-theoretic torsions
Abstract
In a previous paper, the author introduced a Floer-theoretic torsion invariant IF, which roughly takes the form of a product of a power series counting perturbed pseudo-holomorphic tori, and the Reidemeister torsion of the symplectic Floer complex. We pointed out the formal resemblance of IF with a generating function of genus 1 Gromov invariant; furthermore, for heuristic reasons one also expects a relation with the 1-loop generating function in the A-model side of mirror symmetry, which counts genus 1 holomorphic curves. The present article makes this expected relation precise in the simplest cases, in two variants of the IF defined in the earlier work: the lagrangian intersection version, IF(L, L'), and an S1-equivariant version, IFS1. As a by-product, we obtain some existence results of noncontractible periodic orbits in symplectic dynamics. For example, the results of Gatien-Lalonde are extended to a much wider class of manifolds. The two versions IF(L, L') and IFS1 are only minimally developed in this paper, leaving fuller accounts to future work. The lagrangian intersection version, IF(L, L'), should be viewed as a simplest example of a rigorous definition of the higher-loop ``open Gromov-Witten invariants'' proposed by physicists.
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