Quantum strategy stores isometry channels with n = Θ(1/√ε) queries for error ε, quadratic improvement over classical n = Θ(ε^{-1}).
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Introduces resource theories for asynchronous port-based teleportation with free classical and quantum pre-processing, computes tight fidelity bounds for isotropic, graph, and symmetrized EPR states, and proves the strongest model equals any one-way protocol in surpassing the classical teleportation
Maximal success probability for multicopy teleportation without receiver correction is p(d,k)=k/[d(k-1+d)], attained by explicit protocol using group representation theory, with application to enhanced quantum program storage/retrieval.
citing papers explorer
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Quantum Advantage in Storage and Retrieval of Isometry Channels
Quantum strategy stores isometry channels with n = Θ(1/√ε) queries for error ε, quadratic improvement over classical n = Θ(ε^{-1}).
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A resource theory of asynchronous quantum information processing
Introduces resource theories for asynchronous port-based teleportation with free classical and quantum pre-processing, computes tight fidelity bounds for isotropic, graph, and symmetrized EPR states, and proves the strongest model equals any one-way protocol in surpassing the classical teleportation
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Multicopy quantum state teleportation with application to storage and retrieval of quantum programs
Maximal success probability for multicopy teleportation without receiver correction is p(d,k)=k/[d(k-1+d)], attained by explicit protocol using group representation theory, with application to enhanced quantum program storage/retrieval.