A categorification of Morelli's theorem

Abstract

We prove a theorem relating torus-equivariant coherent sheaves on toric varieties to polyhedrally-constructible sheaves on a vector space. At the level of K-theory, the theorem recovers Morelli's description of the K-theory of a smooth projective toric variety. Specifically, let X be a proper toric variety of dimension n and let M = Lie(T) n be the Lie algebra of the compact dual (real) torus T U(1)n. Then there is a corresponding conical Lagrangian ⊂ T*M and an equivalence of triangulated dg categories T(X) cc(M;), where T(X) is the triangulated dg category of perfect complexes of torus-equivariant coherent sheaves on X and cc(M;) is the triangulated dg category of complex of sheaves on M with compactly supported, constructible cohomology whose singular support lies in . This equivalence is monoidal---it intertwines the tensor product of coherent sheaves on X with the convolution product of constructible sheaves on M.