On the Gaussianity of Kolmogorov Complexity of Mixing Sequences

Abstract

Let K(X1, …, Xn) and H(Xn | Xn-1, …, X1) denote the Kolmogorov complexity and Shannon's entropy rate of a stationary and ergodic process \Xi\i=-∞∞. It has been proved that \[ K(X1, …, Xn)n - H(Xn | Xn-1, …, X1) → 0, \] almost surely. This paper studies the convergence rate of this asymptotic result. In particular, we show that if the process satisfies certain mixing conditions, then there exists σ<∞ such that n(K(X1:n)n- H(X0|X1,…,X-∞)) →d N(0,σ2). Furthermore, we show that under slightly stronger mixing conditions one may obtain non-asymptotic concentration bounds for the Kolmogorov complexity.