Title :
An extremal inequality for long Markov chains
Author :
Courtade, Thomas A. ; Jiantao Jiao
Author_Institution :
Dept. of Electr. Eng., Univ. of California, Berkeley, Berkeley, CA, USA
fDate :
Sept. 30 2014-Oct. 3 2014
Abstract :
Let X, Y be jointly Gaussian vectors, and consider random variables U, V that satisfy the Markov constraint U - X - Y - V. We prove an extremal inequality relating the mutual informations between all (42) pairs of random variables from the set (U, X, Y, V). As a first application, we show that the rate region for the two-encoder quadratic Gaussian source coding problem follows as an immediate corollary of the the extremal inequality. In a second application, we establish the rate region for a vector-Gaussian source coding problem where Löwner-John ellipsoids are approximated based on rate-constrained descriptions of the data.
Keywords :
Gaussian processes; Markov processes; random processes; source coding; Gaussian vector; Löwner-John ellipsoid; Markov chains; Markov constraint; extremal inequality; random variable; two-encoder quadratic Gaussian source coding problem; vector-Gaussian source coding problem; Approximation methods; Decoding; Electrical engineering; Ellipsoids; Markov processes; Source coding; Vectors;
Conference_Titel :
Communication, Control, and Computing (Allerton), 2014 52nd Annual Allerton Conference on
Conference_Location :
Monticello, IL
DOI :
10.1109/ALLERTON.2014.7028531
