The multi-sender multicast index coding

We focus on the following instance of an index coding problem, where a set of receivers are required to decode multiple messages, whilst each knows one of the messages a priori. In particular, here we consider a generalized setting where they are multiple senders, each sender only knows a subset of messages, and all senders are required to collectively transmit the index code. For a single sender, Ong and Ho (ICC, 2012) have established the optimal index codelength, where the lower bound was obtained using a pruning algorithm. In this paper, the pruning algorithm is simplified, and used in conjunction with an appending technique to give a lower bound to the multi-sender case. An upper bound is derived based on network coding. While the two bounds do not match in general, for the special case where no two senders know any message bit in common, the bounds match, giving the optimal index codelength. The results are derived based on graph theory, and are expressed in terms of strongly connected components.

[1]  Lawrence Ong,et al.  Optimal index codes for a class of multicast networks with receiver side information , 2012, 2012 IEEE International Conference on Communications (ICC).

[2]  Ziv Bar-Yossef,et al.  Index Coding With Side Information , 2006, IEEE Transactions on Information Theory.

[3]  Uri Stav,et al.  Non-Linear Index Coding Outperforming the Linear Optimum , 2007, 48th Annual IEEE Symposium on Foundations of Computer Science (FOCS'07).

[4]  Yitzhak Birk,et al.  Coding on demand by an informed source (ISCOD) for efficient broadcast of different supplemental data to caching clients , 2006, IEEE Transactions on Information Theory.

[5]  Alexander Sprintson,et al.  On the Index Coding Problem and Its Relation to Network Coding and Matroid Theory , 2008, IEEE Transactions on Information Theory.

[6]  Yeow Meng Chee,et al.  On the Security of Index Coding With Side Information , 2011, IEEE Transactions on Information Theory.

[7]  Tobias J. Oechtering,et al.  Broadcast Capacity Region of Two-Phase Bidirectional Relaying , 2007, IEEE Transactions on Information Theory.

[8]  Lawrence Ong,et al.  On the Equal-Rate Capacity of the AWGN Multiway Relay Channel , 2012, IEEE Transactions on Information Theory.

[9]  Gregory Gutin,et al.  Digraphs - theory, algorithms and applications , 2002 .

[10]  Tetsunao Matsuta,et al.  国際会議開催報告:2013 IEEE International Symposium on Information Theory , 2013 .