Relative Calabi-Yau structure on microlocalization

Abstract

For an oriented manifold M and a compact subanalytic Legendrian ⊂eq S*M, we construct a canonical strong smooth relative Calabi--Yau structure on the microlocalization at infinity and its left adjoint ml: μ sh() Sh(M)0 : m between compactly supported sheaves on M with singular support on and microsheaves on . We also construct a canonical strong Calabi-Yau structure on microsheaves μ sh(). Our approach does not require local properness and hence does not depend on arborealization. We thus obtain a canonical smooth relative Calabi-Yau structure on the Orlov functor for wrapped Fukaya categories of cotangent bundles with Weinstein stops, such that the wrap-once functor is the inverse dualizing bimodule.