Koszul duality patterns in Floer theory

Abstract

We study symplectic invariants of the open symplectic manifolds X obtained by plumbing cotangent bundles of 2-spheres according to a plumbing tree . For any tree , we calculate (DG-)algebra models of the Fukaya category F(X) of closed exact Lagrangians in X and the wrapped Fukaya category W(X). When is a Dynkin tree of type An or Dn (and conjecturally also for E6,E7,E8), we prove that these models for the Fukaya category F(X) and W(X) are related by (derived) Koszul duality. As an application, we give explicit computations of symplectic cohomology of X for =An,Dn, based on the Legendrian surgery formula of Bourgeois, Ekholm and Eliashberg.