Analysis and Code Design for the Binary CEO Problem Under Logarithmic Loss

The L-link binary Chief Executive Officer (CEO) problem under logarithmic loss is investigated in this paper. A quantization splitting technique is applied to convert the problem under consideration to a (2L − 1)-step successive Wyner-Ziv (WZ) problem, for which a practical coding scheme is proposed. In the proposed scheme, low-density generator-matrix (LDGM) codes are used for binary quantization while low-density parity-check (LDPC) codes are used for syndrome generation; the decoder performs successive decoding based on the received syndromes and produces M. Nangir was with the He is now with the DRAFT many seemingly simple sources and distortion measures, the understanding of the relevant information-theoretic limits is rather limited. A remarkable exception is a somewhat underappreciated distortion measure called logarithmic loss (log-loss). As shown by Courtade and Weissman [17], the rate-distortion region of the CEO problem under log-loss admits a single-letter characterization for arbitrary finite-alphabet sources and noisy observations. Different from the conventional distortion measures which are typically imposed on "hard" reconstructions defined over the given source alphabet, the reconstructions associated with DRAFT

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“…We shall derive several analytical results surrounding Definition 5. An investigation along this line was initiated in [28] for the case L = 2.…”

Section: Analytical Resultsmentioning

confidence: 99%

“…These corner points can be achieved via successive Wyner-Ziv coding with decoding order U π(L) → U π(L−1) → · · · → U π(1) (an implementation of this scheme for the case L = 2 can be found in [28]).…”

Section: Quantization Splittingmentioning

confidence: 99%

Successive Wyner-Ziv Coding for the Binary CEO Problem Under Logarithmic Loss

Nangir

Asvadi

Ahmadian-Attari

et al. 2019

IEEE Trans. Commun.

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“…An improved performance can be achieved by increasing n, l, and also using better source splitters. Based on the numerical and analytical results in [16] for a two-link binary CEO problem, the allocation d 1 = d 2 is not optimal for some values of the sum-rate and distortion, even in the case of equal noise parameters p 1 = p 2 . This surprising result is also true for the multi-link case.…”

Section: Results and Performance Analysismentioning

confidence: 99%

“…Furthermore, we assume BSC test-channel models for the encoders in each link, i.e., the Encoder i is modeled by a BSC with the crossover probability d i . Note that as far as the sum-rate distortion function is concerned, the timesharing variable Q can be assumed to be a constant and hence it is eliminated [16]. Under these assumptions, the sum-rate and distortion bounds are derived,…”

Section: Problem Statement and System Modelmentioning

confidence: 99%

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Successive Wyner-Ziv Coding for the Binary CEO Problem under Log-Loss

Nangir

Asvadi

Ahmadian-Attari

2018

2018 29th Biennial Symposium on Communications (BSC)

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An l-link binary CEO problem is considered in this paper. We present a practical encoding and decoding scheme for this problem employing the graphbased codes. A successive coding scheme is proposed for converting an l-link binary CEO problem to the (2l − 1) single binary Wyner-Ziv (WZ) problems. By using the compound LDGM-LDPC codes, the theoretical bound of each binary WZ is asymptotically achievable. Our proposed decoder successively decodes the received data by employing the well-known Sum-Product (SP) algorithm and leverages them to reconstruct the source. The sum-rate distortion performance of our proposed coding scheme is compared with the theoretical bounds under the logarithmic loss (log-loss) criterion.

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