具有非信令相关性的多址信道编码

IF 2.2 3区计算机科学 Q3 COMPUTER SCIENCE, INFORMATION SYSTEMS

IEEE Transactions on Information Theory Pub Date : 2023-08-08 DOI:10.1109/TIT.2023.3301719

Omar Fawzi;Paul Fermé

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引用次数: 0

摘要

我们在各方之间的非信令相关性的帮助下解决了经典多址信道（MAC）的编码问题。众所周知，非信令辅助不会改变经典点对点信道的容量。然而，最近观察到，可以从两个玩家的非本地游戏构建MAC，同时将游戏的获胜概率与MAC的容量联系起来。通过考虑纠缠（一种特殊的非信号相关性）增加获胜概率的游戏（例如，魔方游戏），这表明对于某些特定类型的信道，发送方之间的纠缠可以增加容量。在这项工作中，我们在各方之间的非信号相关性的帮助下，为理解MAC的能力区域做出了一些贡献。我们开发了一个线性程序，计算编码超过$n$个拷贝的MAC$W$的最佳成功概率，其大小以$n$为多项式增长。通过求解这个线性程序，我们可以实现MAC的内部边界。将该方法应用于二进制加法器信道，我们表明，使用非信号辅助，即使在零误差的情况下，也可以达到和速率$\frac｛\log_2（72）｝｛4｝\simeq 1.5425$，这超过了在无辅助情况下$1.5$的最大和速率容量。对于噪声信道，其中零误差非信令辅助容量区域是微不足道的，我们可以使用级联码来获得容量区域中的可实现点。应用于二进制加法器信道的噪声版本，我们表明非信令辅助仍然提高了和速率容量。作为对这些可实现性结果的补充，我们给出了非信号辅助容量区域的上界，该上界与非辅助容量区域具有相同的表达，只是通道输入不需要独立。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Multiple-Access Channel Coding With Non-Signaling Correlations

We address the problem of coding for classical multiple-access channels (MACs) with the assistance of non-signaling correlations between parties. It is well-known that non-signaling assistance does not change the capacity of classical point-to-point channels. However, it was recently observed that one can construct MACs from two-player nonlocal games while relating the winning probability of the game to the capacity of the MAC. By considering games for which entanglement (a special kind of non-signaling correlation) increases the winning probability (e.g., the Magic Square game), this shows that for some specific kinds of channels, entanglement between the senders can increase the capacity. In this work, we make several contributions towards understanding the capacity region for MACs with the assistance of non-signaling correlations between the parties. We develop a linear program computing the optimal success probability for coding over

$n$

copies of a MAC

$W$

with size growing polynomially in

$n$

. Solving this linear program allows us to achieve inner bounds for MACs. Applying this method to the binary adder channel, we show that using non-signaling assistance, the sum-rate

$\frac {\log _{2}(72)}{4} \simeq 1.5425$

can be reached even with zero error, which beats the maximum sum-rate capacity of 1.5 in the unassisted case. For noisy channels, where the zero-error non-signaling assisted capacity region is trivial, we can use concatenated codes to obtain achievable points in the capacity region. Applied to a noisy version of the binary adder channel, we show that non-signaling assistance still improves the sum-rate capacity. Complementing these achievability results, we give an outer bound on the non-signaling assisted capacity region that has the same expression as the unassisted region except that the channel inputs are not required to be independent. Finally, we show that the capacity region with non-signaling assistance shared only between each sender and the receiver independently is the same as without assistance.

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来源期刊

IEEE Transactions on Information Theory 工程技术-工程：电子与电气

CiteScore

5.70

自引率

20.00%

发文量

514

审稿时长

12 months

期刊介绍： The IEEE Transactions on Information Theory is a journal that publishes theoretical and experimental papers concerned with the transmission, processing, and utilization of information. The boundaries of acceptable subject matter are intentionally not sharply delimited. Rather, it is hoped that as the focus of research activity changes, a flexible policy will permit this Transactions to follow suit. Current appropriate topics are best reflected by recent Tables of Contents; they are summarized in the titles of editorial areas that appear on the inside front cover.