A Hamiltonian n BO(n)-action, stratified Morse theory and the J-homomorphism

Abstract

We use sheaves of spectra to quantize a Hamiltonian n BO(n)-action on NT*RN that naturally arises from Bott periodicity. We employ the category of correspondences developed in [GaRo] to give an enrichment of stratified Morse theory by the J-homomorphism. This provides a key step in the following work [Jin] on the proof of a claim in [JiTr]: the classifying map of the local system of brane structures on an (immersed) exact Lagrangian submanifold L⊂ T*RN is given by the composition of the stable Gauss map L→ U/O and the delooping of the J-homomorphism U/O→ BPic(S). We put special emphasis on the functoriality and (symmetric) monoidal structures of the categories involved, and as a byproduct, we produce several concrete constructions of (commutative) algebra/module objects and (right-lax) morphisms between them in the (symmetric) monoidal (∞, 2)-category of correspondences, generalizing the construction out of Segal objects in [GaRo], which might be of interest by its own.