The K\"unneth theorem for the Fukaya algebra of a product of Lagrangians

Abstract

Given a compact Lagrangian submanifold L of a symplectic manifold (M,ω), Fukaya, Oh, Ohta and Ono construct a filtered A∞-algebra F(L), on the cohomology of L, which we call the Fukaya algebra of L. In this paper we describe the Fukaya algebra of a product of two Lagrangians submanifolds L1× L2. Namely, we show that F(L1× L2) is quasi-isomorphic to F(L1)∞ F(L2), where ∞ is the tensor product of filtered A∞-algebras defined in arXiv:1404.7184. As a corollary of this quasi-isomorphism we obtain a description of the bounding cochains on F(L1× L2) and of the Floer cohomology of L1× L2.