Extremal Marginal States of Maximal Rank in (d, d+m)

Abstract

We study the extreme points of the convex set C(ρ1,ρ2) of bipartite quantum states with fixed marginals ρ1 and ρ2. We construct extreme points in (d,\,d+m) dimension, of rank d+m, matching the highest possible value, for all d≥ 3, m > d2-2d-22 (when d=2, m≥ 1). This proves the existence of extremal states with relatively large rank and also covers all the known examples. We further show that, in order to analyze the extreme points of C(ρ1,ρ2), it is sufficient to study the special case C(D1,D2), where the marginals are diagonal. Additionally, we observe that it is sufficient to consider d1≤ d2. Thus, our results show that apart from possibly a few finite cases, for each d1, the maximal rank is achieved almost all times.