Products of locally conformal symplectic manifolds

Abstract

Given two locally conformal symplectic (LCS) structures on manifolds M1 and M2, we construct a natural +-torsor of locally conformal symplectic structures on a certain covering space M1 M2 of M1 × M2. As the smooth construction of M1 M2 is natural from the perspective of flat line bundles, we use this language to phrase the LCS theory. This construction shares many properties with, and in a sense generalizes, the standard symplectic product. Notably, for a Hamiltonian isotopy φt of an LCS manifold M, there is an associated Lagrangian embedding (φ1) M M M, in which certain fixed points of φ1 are in bijection with intersection points of (φ1) with the diagonal = (id). Using a Lagrangian intersection of result of the first author and E. Murphy, we may conclude that if φt is a C0-small Hamiltonian isotopy, then the number of fixed points of φ1 is bounded below by the rank of the Novikov theory associated to the Lee class of the LCS structure on M. Finally, we end the paper by constructing the suspension of a Lagrangian submanifold along a Hamiltonian isotopy in the LCS theory, again generalizing the symplectic setting.