Geometry of syzygies via Poncelet varieties

Abstract

We consider the Grassmannian Gr(k,n) of (k+1)-dimensional linear subspaces of Vn=H0(1,1(n)). We define Xk,r,d as the classifying space of the k-dimensional linear systems of degree n on 1 whose basis realize a fixed number of polynomial relations of fixed degree, say a fixed number of syzygies of a certain degree. The first result of this paper is the computation of the dimension of Xk,r,d. In the second part we make a link between Xk,r,d and the Poncelet varieties. In particular, we prove that the existence of linear syzygies implies the existence of singularities on the Poncelet varieties.