Related papers: Characterizing generalized axisymmetric quantum states in $d\times d$ systems

Characterizing generalized axisymmetric quantum states in $d\times d$ systems

URL: http://arxiv.org/abs/2202.11033v2
Date: Fri, 2 Sep 2022 08:57:16 GMT
Title: Characterizing generalized axisymmetric quantum states in $d\times d$ systems
Authors: Marcel Seelbach Benkner, Jens Siewert, Otfried G\"uhne, Gael Sent\'is
Abstract summary: We introduce a family of highly symmetric bipartite quantum states in arbitrary dimensions. We solve the separability problem for a subspace of these states and show that a sizable part of the family is bound entangled. Our results allow us to estimate entanglement properties of arbitrary states, as general states can be symmetrized to the considered family by local operations.
Score: 0.0
License: http://creativecommons.org/licenses/by-sa/4.0/
Abstract: We introduce a family of highly symmetric bipartite quantum states in arbitrary dimensions. It consists of all states that are invariant under local phase rotations and local cyclic permutations of the basis. We solve the separability problem for a subspace of these states and show that a sizable part of the family is bound entangled. We also calculate some of the Schmidt numbers for the family in $d = 3$, thereby characterizing the dimensionality of entanglement. Our results allow us to estimate entanglement properties of arbitrary states, as general states can be symmetrized to the considered family by local operations.

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