AbstractKolmogorov complexity and algorithmic probability are defined only up to an additive resp. multiplicative constant, since their actual values depend on the choice of the universal reference computer. In this paper, we analyze a natural approach to eliminate this machine-dependence.Our method is to assign algorithmic probabilities to the different computers themselves, based on the idea that “unnatural” computers should be hard to emulate. Therefore, we study the Markov process of universal computers randomly emulating each other. The corresponding stationary distribution, if it existed, would give a natural and machine-independent probability measure on the computers, and also on the binary strings.Unfortunately, we show that no sta...
Although information content is invariant up to an additive constant, the range of possible additive...
AbstractThe Bayesian program in statistics starts from the assumption that an individual can always ...
Abstract—An event with low probability is unlikely to happen, but events with low probability happen...
<p>Previously referred to as ‘miraculous’ in the scientific literature because of its powerful prope...
Given the widespread use of lossless compression algorithms to approximate algorithmic (Kolmogorov-C...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
The traditional theory of Kolmogorov complexity and algorithmic probability focuses on monotone Tur...
In this dissertation we consider two different notions of randomness and their applica-tions to prob...
This thesis establishes significant new results in the area of algorithmic randomness. These results...
Given the widespread use of lossless compression algorithms to approximate algorithmic (Kolmogorov-C...
AbstractThere are two fundamental computably enumerable sets associated with any Kolmogorov complexi...
We introduce the {it natural halting probability} and the {it natural complexity} of a Turing ma...
In this dissertation we consider two different notions of randomness and their applications to probl...
The concept of effective complexity of an object as the minimal description length of its regulariti...
Abstract. There are two fundamental computably enumerable sets associated with any Kolmogorov comple...
Although information content is invariant up to an additive constant, the range of possible additive...
AbstractThe Bayesian program in statistics starts from the assumption that an individual can always ...
Abstract—An event with low probability is unlikely to happen, but events with low probability happen...
<p>Previously referred to as ‘miraculous’ in the scientific literature because of its powerful prope...
Given the widespread use of lossless compression algorithms to approximate algorithmic (Kolmogorov-C...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
The traditional theory of Kolmogorov complexity and algorithmic probability focuses on monotone Tur...
In this dissertation we consider two different notions of randomness and their applica-tions to prob...
This thesis establishes significant new results in the area of algorithmic randomness. These results...
Given the widespread use of lossless compression algorithms to approximate algorithmic (Kolmogorov-C...
AbstractThere are two fundamental computably enumerable sets associated with any Kolmogorov complexi...
We introduce the {it natural halting probability} and the {it natural complexity} of a Turing ma...
In this dissertation we consider two different notions of randomness and their applications to probl...
The concept of effective complexity of an object as the minimal description length of its regulariti...
Abstract. There are two fundamental computably enumerable sets associated with any Kolmogorov comple...
Although information content is invariant up to an additive constant, the range of possible additive...
AbstractThe Bayesian program in statistics starts from the assumption that an individual can always ...
Abstract—An event with low probability is unlikely to happen, but events with low probability happen...