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Paper detail

The Quantum Entropy Cone of Stabiliser States

We investigate the universal linear inequalities that hold for the von Neumann entropies in a multi-party system, prepared in a stabiliser state. We demonstrate here that entropy vectors for stabiliser states satisfy, in addition to the classic inequalities, a type of linear rank inequalities associated with the combinatorial structure of normal subgroups of certain matrix groups. In the 4-party case, there is only one such inequality, the so-called Ingleton inequality. For these systems we show that strong subadditivity, weak monotonicity and Ingleton inequality exactly characterize the entropy cone for stabiliser states.

preprint2013arXivOpen access
Noah LindenFrantišek MatúšMary Beth RuskaiAndreas Winter
math.ITInformation Theorymath-phmath.MPquant-ph
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Noah LindenFrantišek MatúšMary Beth RuskaiAndreas Winter

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