English

Network Compression: Memory-Assisted Universal Coding of Sources with Correlated Parameters

Information Theory 2012-10-09 v1 math.IT

Abstract

In this paper, we propose {\em distributed network compression via memory}. We consider two spatially separated sources with correlated unknown source parameters. We wish to study the universal compression of a sequence of length nn from one of the sources provided that the decoder has access to (i.e., memorized) a sequence of length mm from the other source. In this setup, the correlation does not arise from symbol-by-symbol dependency of two outputs from the two sources (as in Slepian-Wolf setup). Instead, the two sequences are correlated because they are originated from the two sources with \emph{unknown} correlated parameters. The finite-length nature of the compression problem at hand requires considering a notion of almost lossless source coding, where coding incurs an error probability pe(n)p_e(n) that vanishes as sequence length nn grows to infinity. We obtain bounds on the redundancy of almost lossless codes when the decoder has access to a random memory of length mm as a function of the sequence length nn and the permissible error probability pe(n)p_e(n). Our results demonstrate that distributed network compression via memory has the potential to significantly improve over conventional end-to-end compression when sufficiently large memory from previous communications is available to the decoder.

Keywords

Cite

@article{arxiv.1210.2144,
  title  = {Network Compression: Memory-Assisted Universal Coding of Sources with Correlated Parameters},
  author = {Ahmad Beirami and Faramarz Fekri},
  journal= {arXiv preprint arXiv:1210.2144},
  year   = {2012}
}

Comments

2012 Allerton Conference

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