Bounds on Hilbert functions with application to convexity

Abstract

Given a subspace U⊂C[x1,…,xn]d we consider the closure of the image of the rational map Pn-1 U-1 given by U. Its coordinate ring is isomorphic to i 0 Ui where Ui is the degree i component. We consider the Hilbert function of this algebra in the case where U contains a regular sequence, equivalently the map is a morphism, and find lower bounds for the dimension of the degree 2 component. We apply our bounds to study the boundary structure of certain convex sets, called Gram spectrahedra, which are linked to sum of squares representations of non-negative polynomials.