The p-cycle of Holonomic D-modules and Quantization of Exact Algebraic Lagrangians

Abstract

Let X=An be complex affine space, and let T*X be its cotangent bundle. For any exact Lagrangian L⊂ T*X, we define a new invariant, A, living in DivQ/Z(L). We call this invariant the monodromy divisor of L. We conjecture that the existence of a finite order character of π1(L) whose monodromy is exactly A defines an obstruction to attaching a holonomic DX-module M associated to L - here, the association goes via positive characteristic and p-supports. In the case where HdR1(L)=0, we prove this conjecture, and then go on the show that the set of such holonomic DX-modules forms a torsor over the group of finite order characters of π1. This proves a version of a conjecture of Kontsevich. As a consequence, we deduce that the group of Morita autoequivalences of the n-th Weyl algebra is isomorphic to the group of symplectomorphisms of T*An. This generalizes an old theorem of Dixmier (in the case n=1) and settles a conjecture of Belov-Kanel and Kontsevich in general.