Complexity of the positive semidefinite matrix completion problem with a rank constraint

Abstract

We consider the decision problem asking whether a partial rational symmetric matrix with an all-ones diagonal can be completed to a full positive semidefinite matrix of rank at most k. We show that this problem is -hard for any fixed integer k 2. Equivalently, for k 2, it is -hard to test membership in the rank constrained elliptope k(G), i.e., the set of all partial matrices with off-diagonal entries specified at the edges of G, that can be completed to a positive semidefinite matrix of rank at most k. Additionally, we show that deciding membership in the convex hull of k(G) is also -hard for any fixed integer k 2.