Fano Schemes of Complete Intersections in Toric Varieties

Abstract

We study Fano schemes Fk(X) for complete intersections X in a projective toric variety Y⊂ Pn. Our strategy is to decompose Fk(X) into closed subschemes based on the irreducible decomposition of Fk(Y) as studied by Ilten and Zotine. We define the expected dimension for these subschemes, which always gives a lower bound on the actual dimension. Under additional assumptions, we show that these subschemes are non-empty and smooth of the expected dimension. Using tools from intersection theory, we can apply these results to count the number of linear subspaces in X when the expected dimension of Fk(X) is zero.