On Fano Schemes of Toric Varieties

Abstract

Let XA be the projective toric variety corresponding to a finite set of lattice points A. We show that irreducible components of the Fano scheme Fk(XA) parametrizing k-dimensional linear subspaces of XA are in bijection to so-called maximal Cayley structures for A. We explicitly describe these irreducible components and their intersection behaviour, characterize when Fk(XA) is connected, and prove that if XA is smooth in dimension k, then every component of Fk(XA) is smooth in its reduced structure. Furthermore, in the special case k= XA-1, we describe the non-reduced structure of Fk(XA). Our main result is closely related to concurrent work done independently by Furukawa and Ito.