In this paper, we present a theoretical effort to connect the theory of program size to psychology by implementing a concrete language of thought with Turing-computable Kolmogorov complexity (LT^2C^2) satisfying the following requirements: 1) to be simple enough so that the complexity of any given finite binary sequence can be computed, 2) to be based on tangible operations of human reasoning (printing, repeating,. . . ), 3) to be sufficiently powerful to generate all possible sequences but not too powerful as to identify regularities which would be invisible to humans. We first formalize LT^2C^2, giving its syntax and semantics, and defining an adequate notion of program size. Our setting leads to a Kolmogorov complexity function relative ...
Although information content is invariant up to an additive constant, the range of possible additive...
We show that real-value approximations of Kolmogorov-Chaitin complexity K(s) using the algorithmic c...
We propose a test based on the theory of algorithmic complexity and an experimental evaluation of Le...
In this paper, we present a theoretical effort to connect the theory of program size to psychology b...
Abstract. Computable versions of Kolmogorov complexity have been used in the context of pattern disc...
Computable versions of Kolmogorov complexity have beenused in the context of pattern discovery [1]. ...
Kolmogorov-Chaitin complexity has long been believed to be impossible to approximate when it comes t...
Algorithmic complexity provides a mathematical formal notion of string complexity. Building on this,...
We overview logical and computational explanations of the notion of tractability as applied in cogni...
The question of natural measures of complexity for objects other than strings and sequences, in part...
Within psychology, neuroscience and artificial intelligence, there has been increasing interest in t...
This is a presentation about joint work between Hector Zenil and Jean-Paul Delahaye. Zenil presents ...
Kolmogorov has defined the complexity of a sequence of bits to be the minimal size of (the descripti...
We propose a measure based upon the fundamental theoretical concept in algorithmic information theor...
Abstract. Although information content is invariant up to an additive constant, the range of pos-sib...
Although information content is invariant up to an additive constant, the range of possible additive...
We show that real-value approximations of Kolmogorov-Chaitin complexity K(s) using the algorithmic c...
We propose a test based on the theory of algorithmic complexity and an experimental evaluation of Le...
In this paper, we present a theoretical effort to connect the theory of program size to psychology b...
Abstract. Computable versions of Kolmogorov complexity have been used in the context of pattern disc...
Computable versions of Kolmogorov complexity have beenused in the context of pattern discovery [1]. ...
Kolmogorov-Chaitin complexity has long been believed to be impossible to approximate when it comes t...
Algorithmic complexity provides a mathematical formal notion of string complexity. Building on this,...
We overview logical and computational explanations of the notion of tractability as applied in cogni...
The question of natural measures of complexity for objects other than strings and sequences, in part...
Within psychology, neuroscience and artificial intelligence, there has been increasing interest in t...
This is a presentation about joint work between Hector Zenil and Jean-Paul Delahaye. Zenil presents ...
Kolmogorov has defined the complexity of a sequence of bits to be the minimal size of (the descripti...
We propose a measure based upon the fundamental theoretical concept in algorithmic information theor...
Abstract. Although information content is invariant up to an additive constant, the range of pos-sib...
Although information content is invariant up to an additive constant, the range of possible additive...
We show that real-value approximations of Kolmogorov-Chaitin complexity K(s) using the algorithmic c...
We propose a test based on the theory of algorithmic complexity and an experimental evaluation of Le...