The authors prove existence of a unitary that maps a two-qubit state to one where a single observable expectation equals the initial concurrence and demonstrate a robust optimal control implementation via numerical simulations.
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Unified-(q,s) entropy entanglement is an entanglement monotone and monogamous for q>1, qs≥1, yielding one complete tightly completely monogamous GlMEM and three incomplete ones based on unified entropy.
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Existence of a robust optimal control process for efficient measurements in a two-qubit system
The authors prove existence of a unitary that maps a two-qubit state to one where a single observable expectation equals the initial concurrence and demonstrate a robust optimal control implementation via numerical simulations.
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Unified entropy entanglement
Unified-(q,s) entropy entanglement is an entanglement monotone and monogamous for q>1, qs≥1, yielding one complete tightly completely monogamous GlMEM and three incomplete ones based on unified entropy.