Results 41 to 50 of about 5,151,731 (334)
Classical capacity of fermionic product channels
, 2005 12 pages, 2 ...
Sergey Bravyi
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Commitment capacity of classical-quantum channels
2022 IEEE International Symposium on Information Theory (ISIT), 2022 We study commitment scheme for classical-quantum channels. To accomplish this we define various notions of commitment capacity for these channels and prove matching upper and lower bound on it in terms of the conditional entropy. Our achievability (lower bound) proof is quantum generalisation of the work of one of the authors (arXiv:2103.11548) which ...
Masahito Hayashi, Naqueeb Ahmad Warsi
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Semidefinite Programming Strong Converse Bounds for Classical Capacity [PDF]
IEEE Transactions on Information Theory, 2016 We investigate the classical communication over quantum channels when assisted by no-signaling and positive-partial-transpose-preserving (PPT) codes, for which both the optimal success probability of a given transmission rate and the one-shot $\epsilon $
Xin Wang, Wei Xie, R. Duan
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Quantitative Finance and Economics, 2023 This study examined the short-term and long-term relationship between credit financing by commercial banks and capacity utilization of the manufacturing sector in Nigeria.
Kamilu A. Saka , Yisau I. Bolanle
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Optimal storage capacity of quantum Hopfield neural networks
Physical Review Research, 2023 Quantum neural networks form one pillar of the emergent field of quantum machine learning. Here quantum generalizations of classical networks realizing associative memories—capable of retrieving patterns, or memories, from corrupted initial states—have ...
Lukas Bödeker +2 more
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Scientific Reports, 2022 The static loading test is undoubtedly the most reliable method for forecasting the ultimate capacity of the large diameter bored piles (LDBP). However, in-situ loading of this class of piles until reaching failure is practically seldom due to the large ...
M. E. Al-Atroush +2 more
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Regeneration limit of classical Shannon capacity [PDF]
Nature Communications, 2014 Since Shannon derived the seminal formula for the capacity of the additive linear white Gaussian noise channel, it has commonly been interpreted as the ultimate limit of error-free information transmission rate. However, the capacity above the corresponding linear channel limit can be achieved when noise is suppressed using nonlinear elements; that is,
Sergei K. Turitsyn, Mariia Sorokina
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Classical capacities of memoryless but not identical quantum channels [PDF]
Reviews in Mathematical Physics, 2021 We study quantum channels that vary on time in a deterministic way, that is, they change in an independent but not identical way from one to another use. We derive coding theorems for the entanglement-assisted and unassisted classical capacities. We then specialize the theory to lossy bosonic quantum channels and show the existence of contrasting ...
Samad Khabbazi Oskouei, Stefano Mancini
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Legal Status of Artificial Intelligence from Quantum-Theoretic Perspective
BRICS Law Journal, 2023 Massive inclusion of artificial intelligence (AI) in the technosphere and electronic governments urges an update in legal regulation of these and related areas.
E. Melnikova, I. Surov
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Separation Between Quantum Lovász Number and Entanglement-Assisted Zero-Error Classical Capacity [PDF]
IEEE Transactions on Information Theory, 2016 Quantum Lovász number is a quantum generalization of the Lovász number in graph theory. It is the best known efficiently computable upper bound of the entanglement-assisted zero-error classical capacity of a quantum channel.
Xin Wang, R. Duan
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