Construction and properties of a class of private states in arbitrary dimensions

Abstract

We present a construction of quantum states in dimension d that has at least 1 dit of ideal key, called private dits (pdits), which covers most of the known examples of private bits (pbits) d=2. We examine properties of this class of states, focusing mostly on its distance to the set of separable states SEP, showing that for a fixed dimension of key part dk the distance increases with ds. We provide explicit examples of PPT states (in d dimensions) which are nearly as far from separable ones as possible. Precisely, the distance from the set of SEP is 2 - ε, where d scales with ε as d 1/ε3, as opposed to d 2(log(4/ε))2 obtained in [Badziag et al., Phys. Rev. A 90, 012301 (2014)]. We do not use boosting (taking many copies of pdits to boost the distance) as in Badziag et al. paper.