Cyclic group actions on Fukaya categories and mirror symmetry

Abstract

Let (X,ω) be a compact symplectic manifold whose first Chern class c1(X) is divisible by a positive integer n. We construct a Z2n-action on its Fukaya category Fuk(X) and a Zn-action on the local models of its moduli of Lagrangian branes. We show that this action is compatible with the gluing functions for different local models.