Homological Mirror Symmetry for Conic Bundle

Abstract

We study the homological mirror symmetry statement where A-side is the conic bundle Hori--Vafa mirror Y = \uv = f(z)\ ⊂ C2 × (C)n for a Laurent polynomial f in (C)n, and B-side is some a toric Calabi--Yau (n+2)-fold with a smooth anti-canonical divisor removed X = X w-1(-1). We show that when X is the canonical bundle of a toric Fano n-orbifold S and f is its Givental superpotential, the strong deformation retraction skeleton L of Y in the sense of RSTZ (Ruddat--Sibilla--Treumann--Zaslow in Geom. Topol. 18(3):1343--1395, 2014) has a Weinstein neighborhood U, such that the wrapped microlocal sheaf category μShwL(L) Coh(X). This proves a microlocal categorical version of the SYZ mirror in (Abouzaid--Auroux--Katzarkov in Publ. math. IHÉS 123(1):199--282, 2016, Thm. 1.7). We also extend the definition of characteristic cycles for constructible sheaves in cotangent bundles from (Kashiwara--Schapira in Sheaves on Manifolds, Grundlehren math. Wiss. 292, Springer, 1990, Ch. IX) to finite-rank objects in μShwL(L), and describe the characteristic cycles for objects mirror to a coherent sheaf supported on S.