Family Floer theory, non-abelianization, and Spectral Networks

Abstract

In this paper, we study the relationship between Gaiotto-Moore-Neitzke's non-abelianization map and Floer theory. Given a complete GMN quadratic differential φ defined on a closed Riemann surface C, let C be the complement of the poles of φ. In the case where the spectral curve φ is exact with respect to the canonical Liouville form on TC, we show that an "almost flat" GL(1;C)-local system L on φ defines a Floer cohomology local system HFε(φ,L;C) on C for 0< ε≤ 1. Then we show that for small enough ε, the non-abelianization of L is isomorphic to the family Floer cohomology local system HFε(φ,L;C)