English

Synthesizing Correlated Randomness using Algebraic Structured Codes

Information Theory 2021-03-15 v1 math.IT

Abstract

In this problem, Alice and Bob, are provided X1nX_{1}^{n} and X2nX_{2}^{n} that are IID pX1X2p_{X_1 X_2}. Alice and Bob can communicate to Charles over (noiseless) links of rate R1R_1 and R2R_2, respectively. Their goal is to enable Charles generate samples YnY^{n} such that the triple (X1n,X2n,Yn)(X_{1}^{n},X_{2}^{n},Y^{n}) has a PMF that is close, in total variation, to pX1X2Y\prod p_{X_1 X_2 Y}. In addition, the three parties may posses shared common randomness at rate CC. We address the problem of characterizing the set of rate triples (R1,R2,C)(R_1,R_2,C) for which the above goal can be accomplished. We build on our recent findings and propose a new coding scheme based on coset codes. We analyze its information-theoretic performance and derive a new inner bound. We identify examples for which the derived inner bound is analytically proven to contain rate triples that are not achievable via any known unstructured code based coding techniques. Our findings build on a variant of soft-covering which generalizes its applicability to the algebraic structured code ensembles. This adds to the advancement of the use structured codes in network information theory.

Keywords

Cite

@article{arxiv.2103.07339,
  title  = {Synthesizing Correlated Randomness using Algebraic Structured Codes},
  author = {Touheed Anwar Atif and Arun Padakandla and S. Sandeep Pradhan},
  journal= {arXiv preprint arXiv:2103.07339},
  year   = {2021}
}
R2 v1 2026-06-24T00:04:12.774Z