The Dispersion of the Gauss-Markov Source

Abstract

The Gauss-Markov source produces Ui = aUi-1 + Zi for i≥ 1, where U0 = 0, |a|<1 and Zi(0, σ2) are i.i.d. Gaussian random variables. We consider lossy compression of a block of n samples of the Gauss-Markov source under squared error distortion. We obtain the Gaussian approximation for the Gauss-Markov source with excess-distortion criterion for any distortion d>0, and we show that the dispersion has a reverse waterfilling representation. This is the first finite blocklength result for lossy compression of sources with memory. We prove that the finite blocklength rate-distortion function R(n,d,ε) approaches the rate-distortion function R(d) as R(n,d,ε) = R(d) + V(d)nQ-1(ε) + o(1n), where V(d) is the dispersion, ε ∈ (0,1) is the excess-distortion probability, and Q-1 is the inverse of the Q-function. We give a reverse waterfilling integral representation for the dispersion V(d), which parallels that of the rate-distortion functions for Gaussian processes. Remarkably, for all 0 < d≤ σ2(1+|a|)2, R(n,d,ε) of the Gauss-Markov source coincides with that of Zk, the i.i.d. Gaussian noise driving the process, up to the second-order term. Among novel technical tools developed in this paper is a sharp approximation of the eigenvalues of the covariance matrix of n samples of the Gauss-Markov source, and a construction of a typical set using the maximum likelihood estimate of the parameter a based on n observations.