Zero-Delay Rate Distortion via Filtering for Vector-Valued Gaussian Sources

TL;DR

This paper develops a theoretical and practical framework for zero-delay source coding of vector-valued Gaussian sources, providing bounds, realizations, and coding schemes that approach the optimal rate-distortion performance.

Contribution

It introduces a new realization scheme for the Gaussian NRDF with feedback, and proposes a predictive coding scheme that bounds the operational zero-delay RDF, advancing practical coding methods.

Findings

The proposed coding scheme bounds the gap to the theoretical RDF by less than 0.254r + 1 bits.

Vector quantization with infinite dimensions can make the gap negligible.

The framework extends to sources with finite memory under mild conditions.

Abstract

We deal with zero-delay source coding of a vector-valued Gauss-Markov source subject to a mean-squared error (MSE) fidelity criterion characterized by the operational zero-delay vector-valued Gaussian rate distortion function (RDF). We address this problem by considering the nonanticipative RDF (NRDF) which is a lower bound to the causal optimal performance theoretically attainable (OPTA) function and operational zero-delay RDF. We recall the realization that corresponds to the optimal "test-channel" of the Gaussian NRDF, when considering a vector Gauss-Markov source subject to a MSE distortion in the finite time horizon. Then, we introduce sufficient conditions to show existence of solution for this problem in the infinite time horizon. For the asymptotic regime, we use the asymptotic characterization of the Gaussian NRDF to provide a new equivalent realization scheme with feedback which is characterized by a resource allocation (reverse-waterfilling) problem across the dimension of the vector source. We leverage the new realization to derive a predictive coding scheme via lattice quantization with subtractive dither and joint memoryless entropy coding. This coding scheme offers an upper bound to the operational zero-delay vector-valued Gaussian RDF. When we use scalar quantization, then for "r" active dimensions of the vector Gauss-Markov source the gap between the obtained lower and theoretical upper bounds is less than or equal to 0.254r + 1 bits/vector. We further show that it is possible when we use vector quantization, and assume infinite dimensional Gauss-Markov sources to make the previous gap to be negligible, i.e., Gaussian NRDF approximates the operational zero-delay Gaussian RDF. We also extend our results to vector-valued Gaussian sources of any finite memory under mild conditions. Our theoretical framework is demonstrated with illustrative numerical experiments.