Descriptive Complexity of Computable Sequences Revisited

Abstract

The purpose of this paper is to answer two questions left open in [B. Durand, A. Shen, and N. Vereshchagin, Descriptive Complexity of Computable Sequences, Theoretical Computer Science 171 (2001), pp. 47--58]. Namely, we consider the following two complexities of an infinite computable 0-1-sequence α: C0'(α ), defined as the minimal length of a program with oracle 0' that prints α, and M∞(α), defined as C(α1:n|n), where α1:n denotes the length-n prefix of α and C(x|y) stands for conditional Kolmogorov complexity. We show that C0'(α ) M∞(α)+O(1) and M∞(α) is not bounded by any computable function of C0'(α ), even on the domain of computable sequences.