Add to ORKGAlthough information content is invariant up to an additive constant, the range of possible additive constants applicable to programming languages is so large that in practice it plays a major role in the actual evaluation of K(s), the Kolmogorov complexity of a string s. We present a summary of the approach we've developed to overcome the problem by calculating its algorithmic probability and evaluating the algorithmic complexity via the coding theorem, thereby providing a stable framework for Kolmogorov complexity even for short strings. We also show that reasonable formalisms produce reasonable complexity classifications
We show that real-value approximations of Kolmogorov-Chaitin (Km) using the algorithmic Coding theor...
In this dissertation we consider two different notions of randomness and their applica-tions to prob...
textabstractWe study the set of incompressible strings for various resource bounded versions of Kolm...
Although information content is invariant up to an additive constant, the range of possible additive...
Abstract. Although information content is invariant up to an additive constant, the range of pos-sib...
In this paper we define a generalized, two-parameter, Kolmogorov complexity of finite strings which...
(eng) We explain the basics of the theory of the Kolmogorov complexity}, also known as algorithmic i...
The resource bounded Kolmogorov complexity classes identify finite strings (and by extension infini...
This document contains lecture notes of an introductory course on Kolmogorov complexity. They cover ...
In this paper we apply some elementary computability-theoretic notions to algorithmic complexity the...
We introduce randomized time-bounded Kolmogorov complexity (rKt), a natural extension of Levin\u27s ...
Algorithmic information theory (AIT, for short) is a theory of program-size and algorithmic ran-domn...
We introduce randomized time-bounded Kolmogorov complexity (rKt), a natural extension of Levin's not...
This is a presentation about joint work between Hector Zenil and Jean-Paul Delahaye. Zenil presents ...
AbstractIn this paper we apply some elementary computability-theoretic notions to algorithmic comple...
We show that real-value approximations of Kolmogorov-Chaitin (Km) using the algorithmic Coding theor...
In this dissertation we consider two different notions of randomness and their applica-tions to prob...
textabstractWe study the set of incompressible strings for various resource bounded versions of Kolm...
Although information content is invariant up to an additive constant, the range of possible additive...
Abstract. Although information content is invariant up to an additive constant, the range of pos-sib...
In this paper we define a generalized, two-parameter, Kolmogorov complexity of finite strings which...
(eng) We explain the basics of the theory of the Kolmogorov complexity}, also known as algorithmic i...
The resource bounded Kolmogorov complexity classes identify finite strings (and by extension infini...
This document contains lecture notes of an introductory course on Kolmogorov complexity. They cover ...
In this paper we apply some elementary computability-theoretic notions to algorithmic complexity the...
We introduce randomized time-bounded Kolmogorov complexity (rKt), a natural extension of Levin\u27s ...
Algorithmic information theory (AIT, for short) is a theory of program-size and algorithmic ran-domn...
We introduce randomized time-bounded Kolmogorov complexity (rKt), a natural extension of Levin's not...
This is a presentation about joint work between Hector Zenil and Jean-Paul Delahaye. Zenil presents ...
AbstractIn this paper we apply some elementary computability-theoretic notions to algorithmic comple...
We show that real-value approximations of Kolmogorov-Chaitin (Km) using the algorithmic Coding theor...
In this dissertation we consider two different notions of randomness and their applica-tions to prob...
textabstractWe study the set of incompressible strings for various resource bounded versions of Kolm...