Polyhedral faces in Gram spectrahedra of binary forms

Abstract

We analyze both the facial structure of the Gram spectrahedron Gram(f) and of the Hermitian Gram spectrahedron H+(f) of a nonnegative binary form f ∈ R[x, y]2d. We show that if F ⊂eq H+(f) is a polyhedral face of dimension k then k+12 ≤ d. Conversely, for all k ∈ N and d ≥ k+12 we show that the Hermitian Gram spectrahedron of a general positive binary form f ∈ R[x, y]2d with distinct roots contains a face F which is a k-simplex and whose extreme points are rank-one tensors. For all k ∈ N and d ≥ (k+1)2 the (symmetric) Gram spectrahedron of a general positive binary form f ∈ R[x, y]2d contains a polyhedral face F with (rk(F), (F)) = (2(k+1), k).