English

On Network Simplification for Gaussian Half-Duplex Diamond Networks

Information Theory 2018-10-16 v2 math.IT

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 kk relays, out of the NN possible ones? We make progress on this problem for k=1k=1 and k=2k=2 and show that for N=k+1, k{1,2}N=k+1, \ k \in \{1,2\} at least kk+1\frac{k}{k+1} 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 NN, and decreases as NN increases. For all values of NN and kk for which we derive worst case fractions, we also show these to be {approximately} tight. This is accomplished by presenting NN-relay Gaussian HD diamond networks for which the best kk-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

R2 v1 2026-06-22T12:33:08.289Z