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Entanglement Breaking Rank via Complementary Channels and Multiplicative Domains

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arxiv 2211.11909 v1 pith:J2UPYTV5 submitted 2022-11-21 math.OA quant-ph

Entanglement Breaking Rank via Complementary Channels and Multiplicative Domains

classification math.OA quant-ph
keywords entanglementbreakingchannelsmultiplicativequantumrankchoicomplementary
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Quantum entanglement can be studied through the theory of completely positive maps in a number of ways, including by making use of the Choi-Jamilkowski isomorphism, which identifies separable states with entanglement breaking quantum channels, and optimal ensemble length with entanglement breaking rank. The multiplicative domain is an important operator structure in the theory of completely positive maps. We introduce a new technique to determine if a channel is entanglement breaking and to evaluate entanglement breaking rank, based on an analysis of multiplicative domains determined by complementary quantum channels. We give a full description of the class of entanglement breaking channels that have a projection as their Choi matrix, and we show the entanglement breaking and Choi ranks of such channels are equal.

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