Bordism from quasi-isomorphism

Abstract

Let X be a graded Liouville domain. Fix a pair of infinite loop spaces = ( ) living over (BO BU). This determines a spectral Fukaya category F(X;) whenever TX lifts to , containing closed exact Lagrangians L for which TL lifts compatibly to ; and by Bott periodicity and index theory, a Thom spectrum R with bordism theory R*. Suppose that L and K are quasi-isomorphic in the Fukaya category over Z. We prove that: (a) if both lift to F(X;), then there is a rank one R-local system : L BGL1(R) over L so that (L,) and K are quasi-isomorphic in the spectral Fukaya category; (b) when X is polarised and = (BO × F BO), if only K lifts to F(X;), then the composition L B2GL1(R) of the stable Gauss map of L and the delooped J-homomorphism is nullhomotopic. Combined with the computation of the open-closed fundamental class associated to (L,) in PS3, these results have applications to bordism and stable homotopy types of quasi-isomorphic Lagrangians, to Hamiltonian monodromy groups, and to smooth structures on nearby Lagrangians. A key ingredient in the proofs is a new form of obstruction theory for flow categories `lying over' a manifold L, closely related to a `spectral Viterbo restriction functor' also introduced here.