Interpolation of toric varieties

Abstract

Let X⊂ Pd be a m-dimensional variety in d-dimensional projective space. Let k be a positive integer such that m+kk d. Consider the following interpolation problem: does there exist a variety Y⊂ Pd of dimension m+kk -1, with X⊂ Y, such that the tangent space to Y at a point p∈ X is equal to the kth osculating space to X at p, for almost all points p∈ X? In this paper we consider this question in the toric setting. We prove that if X is toric, then there is a unique toric variety Y solving the above interpolation problem. We identify Y in the general case and we explicitly compute some of its invariants when X is a toric curve.