The approximate capacity of the Gaussian N-relay diamond network

We consider the Gaussian “diamond” or parallel relay network, in which a source node transmits a message to a destination node with the help of N relays. Even for the symmetric setting, in which the channel gains to the relays are identical and the channel gains from the relays are identical, the capacity of this channel is unknown in general. The best known capacity approximation is up to an additive gap of order N bits and up to a multiplicative gap of order N2, with both gaps independent of the channel gains. In this paper, we approximate the capacity of the symmetric Gaussian N-relay diamond network up to an additive gap of 1.8 bits and up to a multiplicative gap of a factor 14. Both gaps are independent of the channel gains, and, unlike the best previously known result, are also independent of the number of relays N in the network. Achievability is based on bursty amplify-and-forward, showing that this simple scheme is uniformly approximately optimal, both in the low-rate as well as high-rate regimes. The upper bound on capacity is based on a careful evaluation of the cut-set bound.

• Publication year

  2010

• Venue

  IEEE International Symposium on Information Theory. Proceedings

• Publication date

  2010-08-23

• Fields of study

  Mathematics, Computer Science

• Identifiers
  DOI 10.1109/ISIT.2011.6034040arXiv 1008.3813
• External record

  Open on Semantic Scholar

• Source metadata

  Semantic Scholar

• No claims are published for this paper.

• No concepts are published for this paper.

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