Two results on the size of spectrahedral descriptions

Abstract

A spectrahedron is a set defined by a linear matrix inequality. Given a spectrahedron we are interested in the question of the smallest possible size r of the matrices in the description by linear matrix inequalities. We show that for the n-dimensional unit ball r is at least n2. If n=2k+1, then we actually have r=n. The same holds true for any compact convex set in Rn defined by a quadratic polynomial. Furthermore, we show that for a convex region in R3 whose algebraic boundary is smooth and defined by a cubic polynomial we have that r is at least five. More precisely, we show that if A,B,C are real symmetric matrices such that f(x,y,z)=(I+A x+B y+C z) is a cubic polynomial, the surface in complex projective three-space with affine equation f(x,y,z)=0 is singular.