While tightness of the Berger-Tung inner bound has been established in the quadratic Gaussian case, and its slackness has been demonstrated in another case dealing with sources with common information, the underlying tightness/slackness issue re-mains to be settled in several scenarios. In this context, seeking to study a simple variant of the Berger-Tung problem, we consider doubly symmetric binary sources, Hamming distortion measures, and sum-rate versus sum-distortion. As a first step, in this paper we propose two functions admitting closed-form expressions, prove their local optimality in certain sense, conjecture that those functions specify the Berger-Tung inner bound, and present simulation-based evidence in support of such conjecture. © 2020 IEICE.

Soumya Jana

Department of Electrical Engineering

S. Avasarala

S.M. Sriram

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Journal	Data powered by TypesetProceedings of 2020 International Symposium on Information Theory and its Applications, ISITA 2020
Publisher	Data powered by TypesetInstitute of Electrical and Electronics Engineers Inc.