Schmidt states and positivity of linear maps
classification
🪐 quant-ph
keywords
mapsentanglementpositiveschmidtstatesalgebraicboundedcondition
read the original abstract
Using pure entangled Schmidt states, we show that m-positivity of a map is bounded by the ranks of its negative Kraus matrices. We also give an algebraic condition for a map to be m-positive. We interpret these results in the context of positive maps as entanglement witnesses, and find that only 1-positive maps are needed for testing entanglement.
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