A Rate-Distortion Region Analysis for a Binary CEO Problem

The binary chief executive officer (CEO) problem with an arbitrary number of agents is considered in this paper. A scheme which separates the reconstruction of observations and the final decision of a common source is assumed. Hence, we first derive the outer bound for the rate- distortion region by...

Full description

Saved in:
Bibliographic Details
Published in:2016 IEEE 83rd Vehicular Technology Conference (VTC Spring) pp. 1 - 5
Main Authors: Xin He, Xiaobo Zhou, Juntti, Markku, Matsumoto, Tad
Format: Conference Proceeding
Language:English
Published: IEEE 01.05.2016
Subjects:
Convex functions
Decoding
Distortion
Error probability
Rate-distortion
Source coding
Wireless sensor networks
Online Access:Get full text
Tags: Add Tag
No Tags, Be the first to tag this record!
Description
Summary:The binary chief executive officer (CEO) problem with an arbitrary number of agents is considered in this paper. A scheme which separates the reconstruction of observations and the final decision of a common source is assumed. Hence, we first derive the outer bound for the rate- distortion region by providing the converse proof of a binary multiterminal source coding problem which is the key to solve the binary CEO problem. The distortion of the binary CEO problem is then determined by the Poisson binomial process based on the using majority voting logic for the final decision. The rate-distortion behavior of the binary CEO problem is then analyzed based on the outer bound by solving a convex optimization problem. It is found that the distortion decreases until it converges to a certain level, as the sum rate and/or the number of agents increases.
DOI:10.1109/VTCSpring.2016.7504098