Families of relatively exact Lagrangians, free loop spaces and generalised homology

Abstract

We prove that (under appropriate orientation conditions, depending on R) a Hamiltonian isotopy 1 of a symplectic manifold (M, ω) fixing a relatively exact Lagrangian L setwise must act trivially on R*(L), where R* is some generalised homology theory. We use a strategy inspired by that of Hu, Lalonde and Leclercq (Hu-Lalonde-Leclercq), who proved an analogous result over Z/2 and over Z under stronger orientation assumptions. However the differences in our approaches let us deduce that if L is a homotopy sphere, 1|L is homotopic to the identity. Our technical set-up differs from both theirs and that of Cohen, Jones and Segal (Cohen-Jones-Segal, Cohen). We also prove (under similar conditions) that 1|L acts trivially on R*(L L), where L L is the free loop space of L. From this we deduce that when L is a surface or a K(π, 1), 1|L is homotopic to the identity. Using methods of Lalonde-McDuff, we also show that given a family of Lagrangians all of which are Hamiltonian isotopic to L over a sphere or a torus, the associated fibre bundle cohomologically splits over Z/2.