Higher rank local systems in Lagrangian Floer theory

Abstract

We extend Floer theory for monotone Lagrangians to allow coefficients in local systems of arbitrary rank. Unlike the rank 1 case, this is often obstructed by Maslov 2 discs. We study exactly what the obstruction is and define some natural unobstructed subcomplexes. To illustrate these constructions we do some explicit calculations for the Chiang Lagrangian L ⊂eq CP3. For example, we equip L with a particular rank 2 local system W over the field with 2 elements such that the resulting Floer complex CF*(W,W) is unobstructed despite the presence of Maslov 2 discs. We compute that the cohomology HF*(W,W) is non-zero and deduce that the Chiang Lagrangian cannot be disjoined from RP3 by a Hamiltonian isotopy.