On a Morelli type expression of cohomology classes of toric varieties

Abstract

Let X be a complete -factorial toric variety of dimension n and the fan in a lattice N associated to X. For each cone σ of there corresponds an orbit closure V(σ) of the action of complex torus on X. The homology classes \[V(σ)] σ=k\ form a set of specified generators of Hn-k(X,). It is shown that, given α∈ Hn-k(X,), there is a canonical way to express α as a linear combination of the [V(σ)] with coefficients in the field of rational functions of degree 0 on the Grassmann manifold of (n-k+1)-planes in N. This generalizes Morelli's formula for α the (n-k)-th component of the Todd homology class of the variety X.