Spherical adjunction and Serre functor from microlocalization

Abstract

For a subanalytic Legendrian ⊂eq S*M, we prove that when is either swappable or a full Legendrian stop, the microlocalization at infinity m: Sh(M) → μ sh() is a spherical functor, and the spherical cotwist is the Serre functor on the subcategory Shb(M)0 of compactly supported sheaves with perfect stalks. This is a sheaf theory counterpart (with weaker assumptions) of the results on the cap functor and cup functors between Fukaya categories. When proving spherical adjunction, we deduce the Sato-Sabloff fiber sequence and construct the Guillermou doubling functor for any Reeb flow.