English

An achievable region for the double unicast problem based on a minimum cut analysis

Information Theory 2011-11-03 v1 math.IT

Abstract

We consider the multiple unicast problem under network coding over directed acyclic networks when there are two source-terminal pairs, s1t1s_1-t_1 and s2t2s_2-t_2. Current characterizations of the multiple unicast capacity region in this setting have a large number of inequalities, which makes them hard to explicitly evaluate. In this work we consider a slightly different problem. We assume that we only know certain minimum cut values for the network, e.g., mincut(Si,Tj)(S_i, T_j), where Si{s1,s2}S_i \subseteq \{s_1, s_2\} and Tj{t1,t2}T_j \subseteq \{t_1, t_2\} for different subsets SiS_i and TjT_j. Based on these values, we propose an achievable rate region for this problem based on linear codes. Towards this end, we begin by defining a base region where both sources are multicast to both the terminals. Following this we enlarge the region by appropriately encoding the information at the source nodes, such that terminal tit_i is only guaranteed to decode information from the intended source sis_i, while decoding a linear function of the other source. The rate region takes different forms depending upon the relationship of the different cut values in the network.

Keywords

Cite

@article{arxiv.1111.0595,
  title  = {An achievable region for the double unicast problem based on a minimum cut analysis},
  author = {Shurui Huang and Aditya Ramamoorthy},
  journal= {arXiv preprint arXiv:1111.0595},
  year   = {2011}
}

Comments

ITW, 2011

R2 v1 2026-06-21T19:29:53.769Z