Paper Info
Title
Correspondence And Independence Of Numerical Evaluations Of Algorithmic Information Measures
Abstract
We show that real-value approximations of Kolmogorov-Chaitin complexity K (s) using the algorithmic coding theorem, as calculated from the output frequency of a large set of small deterministic Turing machines with up to 5 states (and 2 symbols), is consistent with the number of instructions used by the Turing machines producing s, which in turn is consistent with strict integer-value program-size complexity (based on our knowledge of the smallest machine in terms of the number of instructions used). We also show that neither K (s) nor the number of instructions used manifests any correlation with Bennett's Logical Depth LD (s), other than what's predicted by the theory (shallow and non-random strings have low complexity under both measures). The agreement between the theory and the numerical calculations shows that despite the undecidability of these theoretical measures, the rate of convergence of approximations is stable enough to devise some applications. We announce a Beta version of an Online Algorithmic Complexity Calculator (OACC) implementing these methods.
Year
DOI
Venue
2013
10.3233/COM-13019
COMPUTABILITY-THE JOURNAL OF THE ASSOCIATION CIE
Keywords
DocType
Volume
Kolmogorov-Chaitin complexity, Solomonoff-Levin algorithmic probability, program-size complexity, Bennett's logical depth, small Turing machines
Journal
2
Issue
ISSN
Citations 
2
2211-3568
3
PageRank 
References 
Authors
0.59
0
4
Name
Order
Citations
PageRank
Fernando Soler-Toscano119526.32
Hector Zenil231047.82
Jean-Paul Delahaye332554.60
Nicolas Gauvrit41018.55