Limit complexities revisited

Abstract

The main goal of this paper is to put some known results in a common perspective and to simplify their proofs. We start with a simple proof of a result from (Vereshchagin, 2002) saying that n(x|n) (here (x|n) is conditional (plain) Kolmogorov complexity of x when n is known) equals 0'(x), the plain Kolmogorov complexity with 0'-oracle. Then we use the same argument to prove similar results for prefix complexity (and also improve results of (Muchnik, 1987) about limit frequencies), a priori probability on binary tree and measure of effectively open sets. As a by-product, we get a criterion of 0' Martin-L\"of randomness (called also 2-randomness) proved in (Miller, 2004): a sequence ω is 2-random if and only if there exists c such that any prefix x of ω is a prefix of some string y such that (y) |y|-c. (In the 1960ies this property was suggested in (Kolmogorov, 1968) as one of possible randomness definitions; its equivalence to 2-randomness was shown in (Miller, 2004) while proving another 2-randomness criterion (see also (Nies et al. 2005)): ω is 2-random if and only if (x) |x|-c for some c and infinitely many prefixes x of ω. Finally, we show that the low-basis theorem can be used to get alternative proofs for these results and to improve the result about effectively open sets; this stronger version implies the 2-randomness criterion mentioned in the previous sentence.