k-Uniform states and quantum information masking

Abstract

A pure state of N parties with local dimension d is called a k-uniform state if all the reductions to k parties are maximally mixed. Based on the connections among k-uniform states, orthogonal arrays and linear codes, we give general constructions for k-uniform states. We show that when d≥ 4k-2 (resp. d≥ 2k-1) is a prime power, there exists a k-uniform state for any N≥ 2k (resp. 2k≤ N≤ d+1). Specially, we give the existence of 4,5-uniform states for almost every N-qudits. Further, we generalize the concept of quantum information masking in bipartite systems given by [Modi et al. Phys. Rev. Lett. 120, 230501 (2018)] to k-uniform quantum information masking in multipartite systems, and we show that k-uniform states and quantum error-correcting codes can be used for k-uniform quantum information masking.