Related papers: Diagonal unitary and orthogonal symmetries in quantum theory

Diagonal unitary and orthogonal symmetries in quantum theory

URL: http://arxiv.org/abs/2010.07898v2
Date: Wed, 4 Aug 2021 11:06:01 GMT
Title: Diagonal unitary and orthogonal symmetries in quantum theory
Authors: Satvik Singh and Ion Nechita
Abstract summary: We show that this class of matrices (and maps) encompasses a wide variety of scenarios, thereby unifying their study. For linear maps, we provide explicit characterizations of the stated covariance in terms of their Kraus, Stinespring, and Choi representations. We also describe the invariant subspaces of these maps and use their structure to provide necessary and sufficient conditions for separability of the associated invariant bipartite states.
Score: 1.5229257192293197
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We analyze bipartite matrices and linear maps between matrix algebras, which are respectively, invariant and covariant, under the diagonal unitary and orthogonal groups' actions. By presenting an expansive list of examples from the literature, which includes notable entries like the Diagonal Symmetric states and the Choi-type maps, we show that this class of matrices (and maps) encompasses a wide variety of scenarios, thereby unifying their study. We examine their linear algebraic structure and investigate different notions of positivity through their convex conic manifestations. In particular, we generalize the well-known cone of completely positive matrices to that of triplewise completely positive matrices and connect it to the separability of the relevant invariant states (or the entanglement breaking property of the corresponding quantum channels). For linear maps, we provide explicit characterizations of the stated covariance in terms of their Kraus, Stinespring, and Choi representations, and systematically analyze the usual properties of positivity, decomposability, complete positivity, and the like. We also describe the invariant subspaces of these maps and use their structure to provide necessary and sufficient conditions for separability of the associated invariant bipartite states.

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