Dimensions of faces of Gram spectrahedra

Abstract

Let f∈n,2d be a sum of squares. The Gram spectrahedron of f is a compact, convex set that parametrizes all sum of squares representations of f. Let F⊂eqGram(f) be a face of its Gram spectrahedron. We are interested in upper bounds for the dimension of F. We show that this upper bound can be determined combinatorially. As it turns out, if the degree is large enough, a face realizing this bound, is a face of a Gram spectrahedron such that the form f is singular. Thus we are also interested in finding better bounds whenever the form f is smooth.