Phase retrievability of frames and quantum channels
Abstract
A phase retrievable quantum channel refers to a quantum channel : B(HA) B(HB) such that there is a positive operator valued measure (POVM) \Fj\ in B(HB) and \*(Fj)\ is a phase retrievable operator valued frame. In this paper we examine the phase retrievable quantum channels in terms of their Kraus representations. For quantum channels of Choi's rank-2, we obtain a necessary and sufficient condition under which it is phase retrievable. For the general case, we present several necessary and/or sufficient conditions. In particular, a necessary and sufficient condition is obtained in terms of the relevant matrix-valued joint spectrum of the Kraus operators. Additionally, we also examine, by examples, the problem of constructing quantum channels such that there exists a minimal number of rank-one observables \Fj\ such that \*(Fj)\ does phase retrieval for HA. Conversely, for a given set of rank-one observables \Fj\j=1N, we present a sufficient condition under which, for every 1≤ r≤ N given, a phase retrievable quantum channel of Choi's rank-r can be explicitly constructed.
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