English

Distributed Source Coding of Correlated Gaussian Sources

Information Theory 2011-02-21 v2 math.IT

Abstract

We consider the distributed source coding system of LL correlated Gaussian sources Yi,i=1,2,...,LY_i,i=1,2,...,L which are noisy observations of correlated Gaussian remote sources Xk,k=1,2,...,KX_k, k=1,2,...,K. We assume that YL=t(Y1,Y2,Y^{L}={}^{\rm t}(Y_1,Y_2, ...,YL)..., Y_L) is an observation of the source vector XK=t(X1,X2,...,XK)X^K={}^{\rm t}(X_1,X_2,..., X_K), having the form YL=AXK+NLY^L=AX^K+N^L, where AA is a L×KL\times K matrix and NL=t(N1,N2,...,NL)N^L={}^{\rm t}(N_1,N_2,...,N_L) is a vector of LL independent Gaussian random variables also independent of XKX^K. In this system LL correlated Gaussian observations are separately compressed by LL encoders and sent to the information processing center. We study the remote source coding problem where the decoder at the center attempts to reconstruct the remote source XKX^K. We consider three distortion criteria based on the covariance matrix of the estimation error on XKX^K. For each of those three criteria we derive explicit inner and outer bounds of the rate distortion region. Next, in the case of K=LK=L and A=ILA=I_L, we study the multiterminal source coding problem where the decoder wishes to reconstruct the observation YL=XL+NLY^L=X^L+N^L. To investigate this problem we shall establish a result which provides a strong connection between the remote source coding problem and the multiterminal source coding problem. Using this result, we drive several new partial solutions to the multiterminal source coding problem.

Keywords

Cite

@article{arxiv.1007.4418,
  title  = {Distributed Source Coding of Correlated Gaussian Sources},
  author = {Yasutada Oohama},
  journal= {arXiv preprint arXiv:1007.4418},
  year   = {2011}
}

Comments

30 pages 4 figures

R2 v1 2026-06-21T15:52:56.758Z