Complexity of complexity and strings with maximal plain and prefix Kolmogorov complexity

TL;DR

This paper explores the maximal complexity of strings in terms of plain and prefix Kolmogorov complexity, providing new bounds, proofs, and generalizations for the complexity relationships of strings.

Contribution

It offers a simplified, tight bound proof for Gacs' complexity result, relates it to Solovay's findings, and extends these results with new bounds and a game-theoretic proof for Miller's generalization.

Findings

Established a tight bound log n - O(1) for plain complexity complexity

Provided a short proof linking Solovay's and Gacs' results

Generalized complexity bounds for strings in co-enumerable sets

Abstract

Peter Gacs showed (Gacs 1974) that for every n there exists a bit string x of length n whose plain complexity C(x) has almost maximal conditional complexity relative to x, i.e., C(C(x)|x) > log n - log^(2) n - O(1). (Here log^(2) i = log log i.) Following Elena Kalinina (Kalinina 2011), we provide a simple game-based proof of this result; modifying her argument, we get a better (and tight) bound log n - O(1). We also show the same bound for prefix-free complexity. Robert Solovay showed (Solovay 1975) that infinitely many strings x have maximal plain complexity but not maximal prefix complexity (among the strings of the same length): for some c there exist infinitely many x such that |x| - C(x) < c and |x| + K(|x|) - K(x) > log^(2) |x| - c log^(3) |x|. In fact, the results of Solovay and Gacs are closely related. Using the result above, we provide a short proof for Solovay's result. We also generalize it by showing that for some c and for all n there are strings x of length n with n - C (x) < c and n + K(n) - K(x) > K(K(n)|n) - 3 K(K(K(n)|n)|n) - c. We also prove a close upper bound K(K(n)|n) + O(1). Finally, we provide a direct game proof for Joseph Miller's generalization (Miller 2006) of the same Solovay's theorem: if a co-enumerable set (a set with c.e. complement) contains for every length a string of this length, then it contains infinitely many strings x such that |x| + K(|x|) - K(x) > log^(2) |x| + O(log^(3) |x|).