Lower bounds on the estimation error in problems of distributed computation

Author(s)

Como, Giacomo; Dahleh, Munther A.

Abstract

Information-theoretic lower bounds on the estimation error are derived for problems of distributed computation. These bounds hold for a network attempting to compute a real-vector-valued function of the global information, when the nodes have access to partial information and can communicate through noisy transmission channels. The presented bounds are algorithm-independent, and improve on recent results by Ayaso et al., where the exponential decay rate of the mean square error was upper-bounded by the minimum normalized cut-set capacity. We show that, if the transmission channels are stochastic, the highest achievable exponential decay rate of the mean square error is in general strictly smaller than the minimum normalized cut-set capacity of the network. This is due to atypical channel realizations, which, despite their asymptotically vanishing probability, affect the error exponent.

Date issued

2009-02

URI

http://hdl.handle.net/1721.1/58983

Department

Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science
Massachusetts Institute of Technology. Laboratory for Information and Decision Systems

Journal

Information Theory and Applications Workshop, 2009

Publisher

Institute of Electrical and Electronics Engineers

Citation

Como, Giacomo, and Dahleh, Munther (2009). Lower bounds on the estimation error in problems of distributed computation. Information Theory and Applications Workshop, 2009 (Piscataway, N.J.: IEEE): 70-76. © Copyright 2009 IEEE

Version: Final published version

Other identifiers

INSPEC Accession Number: 10702535

ISBN

978-1-4244-3990-4