On Network Simplification for Gaussian Half-Duplex Diamond Networks
Abstract
This paper investigates the simplification problem in Gaussian Half-Duplex (HD) diamond networks. The goal is to answer the following question: what is the minimum (worst-case) fraction of the total HD capacity that one can always achieve by smartly selecting a subset of relays, out of the possible ones? We make progress on this problem for and and show that for at least of the total HD capacity is always {approximately (i.e., up to a constant gap)} achieved. Interestingly, and differently from the Full-Duplex (FD) case, the ratio in HD depends on , and decreases as increases. For all values of and for which we derive worst case fractions, we also show these to be {approximately} tight. This is accomplished by presenting -relay Gaussian HD diamond networks for which the best -relay subnetwork has {an approximate} HD capacity equal to the worst-case fraction of the total {approximate} HD capacity. Moreover, we provide additional comparisons between the performance of this simplification problem for HD and FD networks, which highlight their different natures.
Keywords
Cite
@article{arxiv.1601.05161,
title = {On Network Simplification for Gaussian Half-Duplex Diamond Networks},
author = {Martina Cardone and Christina Fragouli and Daniela Tuninetti},
journal= {arXiv preprint arXiv:1601.05161},
year = {2018}
}
Comments
Parts of this work will be presented at ISIT 2016