Related papers: A Limit on the Power of Entanglement-Assistance in Quantum Communication

A Limit on the Power of Entanglement-Assistance in Quantum Communication

URL: http://arxiv.org/abs/2408.17290v2
Date: Mon, 7 Oct 2024 15:36:52 GMT
Title: A Limit on the Power of Entanglement-Assistance in Quantum Communication
Authors: Lasse H. Wolff, Paula Belzig, Matthias Christandl, Bergfinnur Durhuus, Marco Tomamichel,
Abstract summary: The optimal rate of reliable communication over a quantum channel can be enhanced by pre-shared entanglement. A long-standing conjecture asserts that the ratio between the entanglement-assisted and unassisted classical capacities is bounded in finite-dimensional settings. An application to quantum communication with noisy encoders and decoders is given.
Score: 7.366868731714772
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: The optimal rate of reliable communication over a quantum channel can be enhanced by pre-shared entanglement. Whereas the enhancement may be unbounded in infinite-dimensional settings even when the input power is constrained, a long-standing conjecture asserts that the ratio between the entanglement-assisted and unassisted classical capacities is bounded in finite-dimensional settings [Bennett et al., Phys. Rev. Lett. 83, 3081 (2002)]. In this work, we prove this conjecture by showing that their ratio is upper bounded by $o(d^2)$, where $d$ is the input dimension of the channel. An application to quantum communication with noisy encoders and decoders is given.

Related papers

The multimode conditional quantum Entropy Power Inequality and the squashed entanglement of the extreme multimode bosonic Gaussian channels [53.253900735220796]
Inequality determines the minimum conditional von Neumann entropy of the output of the most general linear mixing of bosonic quantum modes. Bosonic quantum systems constitute the mathematical model for the electromagnetic radiation in the quantum regime.
arXiv Detail & Related papers (2024-10-18T13:59:50Z)
Realizing fracton order from long-range quantum entanglement in programmable Rydberg atom arrays [45.19832622389592]
Storing quantum information requires battling quantum decoherence, which results in a loss of information over time. To achieve error-resistant quantum memory, one would like to store the information in a quantum superposition of degenerate states engineered in such a way that local sources of noise cannot change one state into another. We show that this platform also allows to detect and correct certain types of errors en route to the goal of true error-resistant quantum memory.
arXiv Detail & Related papers (2024-07-08T12:46:08Z)
Orthogonality Broadcasting and Quantum Position Verification [3.549868541921029]
Security in quantum cryptographic protocols derives from a possibly weaker property that classical information encoded in certain quantum states cannot be broadcast. We introduce the study of "orthogonality broadcasting"
arXiv Detail & Related papers (2023-11-01T17:37:20Z)
Correlation measures of a quantum state and information characteristics of a quantum channel [0.0]
We discuss the interconnections between basic correlation measures of a bipartite quantum state and basic information characteristics of a quantum channel. We describe properties of the (unoptimized and optimized) quantum discord in infinite bipartite systems.
arXiv Detail & Related papers (2023-04-11T17:58:13Z)
The superadditivity effects of quantum capacity decrease with the dimension for qudit depolarizing channels [0.0]
We study how the gain in quantum capacity of qudit depolarizing channels relates to the dimension of the systems considered. We conclude that when high dimensional qudits experiencing depolarizing noise are considered, the coherent information of the channel is not only an achievable rate but essentially the maximum possible rate for any quantum block code.
arXiv Detail & Related papers (2023-01-24T16:54:09Z)
Bounding quantum capacities via partial orders and complementarity [9.010643838773476]
We give operationally motivated bounds on several quantum capacities, including the quantum capacity and private capacity of a quantum channel and the one-way distillable entanglement and private key of a quantum state. Our bounds help to further understand the interplay between different capacities, as they give operational limitations on superadditivity and the difference between capacities in terms of the information-theoretic properties of the complementary channel or state.
arXiv Detail & Related papers (2022-02-23T18:53:51Z)
Commitment capacity of classical-quantum channels [70.51146080031752]
We define various notions of commitment capacity for classical-quantum channels. We prove matching upper and lower bound on it in terms of the conditional entropy.
arXiv Detail & Related papers (2022-01-17T10:41:50Z)
Direct Quantum Communications in the Presence of Realistic Noisy Entanglement [69.25543534545538]
We propose a novel quantum communication scheme relying on realistic noisy pre-shared entanglement. Our performance analysis shows that the proposed scheme offers competitive QBER, yield, and goodput.
arXiv Detail & Related papers (2020-12-22T13:06:12Z)
Fault-tolerant Coding for Quantum Communication [71.206200318454]
encode and decode circuits to reliably send messages over many uses of a noisy channel. For every quantum channel $T$ and every $eps>0$ there exists a threshold $p(epsilon,T)$ for the gate error probability below which rates larger than $C-epsilon$ are fault-tolerantly achievable. Our results are relevant in communication over large distances, and also on-chip, where distant parts of a quantum computer might need to communicate under higher levels of noise.
arXiv Detail & Related papers (2020-09-15T15:10:50Z)
Infinite-fold enhancement in communications capacity using pre-shared entanglement [2.049702429898688]
Pre-shared entanglement can significantly boost communication rates in the regime of high thermal noise. We propose a structured design of a quantum transmitter and receiver that can harness this purported infinite-fold capacity enhancement.
arXiv Detail & Related papers (2020-01-12T14:05:12Z)
Permutation Enhances Classical Communication Assisted by Entangled States [67.12391801199688]
We show that the capacity satisfies the strong converse property and thus the formula serves as a sharp dividing line between achievable and unachievable rates of communication. As examples, we derive analytically the classical capacity of various quantum channels of interests.
arXiv Detail & Related papers (2020-01-07T01:49:31Z)

This list is automatically generated from the titles and abstracts of the papers in this site.