高斯中继网络的割集界是松散的

2015 53rd Annual Allerton Conference on Communication, Control, and Computing (Allerton) Pub Date : 2015-10-14 DOI:10.1109/ALLERTON.2015.7447136

Xiugang Wu, Ayfer Özgür

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引用次数: 23

摘要

Cover和El Gamal在1979年提出的截集界一直是高斯中继信道容量的最著名的上界。我们提出了一个新的高斯原语中继信道容量上界，它比切集上界更严格。我们的证明是基于典型论证和高斯测度的集中。结合Courtade和Ozgur在2015年提出的一个简单的张紧化论证，我们的结果还表明，目前的高斯中继网络的容量近似是有序最优的，并且导致预常数的下界。高斯中继网络在节点数量上与切集界有线性间隙。

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Cut-set bound is loose for Gaussian relay networks

The cut-set bound developed by Cover and El Gamal in 1979 has since remained the best known upper bound on the capacity of the Gaussian relay channel. We develop a new upper bound on the capacity of the Gaussian primitive relay channel which is tighter than the cut-set bound. Our proof is based on typicality arguments and concentration of Gaussian measure. Combined with a simple tensorization argument proposed by Courtade and Ozgur in 2015, our result also implies that the current capacity approximations for Gaussian relay networks, which have linear gap to the cut-set bound in the number of nodes, are order-optimal and leads to a lower bound on the preconstant.

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2015 53rd Annual Allerton Conference on Communication, Control, and Computing (Allerton)

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