The halting probability of a Turing machine is the probability that the machine will halt if it starts with a random stream written on its one-way input tape. When the machine is universal, this probability is referred to as Chaitin's omega number, and is the most well known example of a real which is random in the sense of Martin-L\"{o}f. Although omega numbers depend on the underlying universal Turing machine, they are robust in the sense that they all have the same Turing degree, namely the degree of the halting problem. In this paper we give precise bounds on the redundancy growth rate that is generally required for the computation of an omega number from another omega number. We show that for each ϵ>1, any pair of omega numbers compute...
The Kučera–Gács theorem is a landmark result in algorithmic randomness asserting that every real is ...
Given the widespread use of lossless compression algorithms to approximate algorithmic (Kolmogorov-C...
We study the notion of universality probability of a universal prefix-free machine, as introduced by...
Chaitin’s number is the halting probability of a universal prefix-free machine, and although it depe...
A Chaitin Omega number is the halting probability of a universal prefix-free Turing machine. Every O...
Abstract. As a natural example of a 1-random real, Chaitin proposed the halting probability Ω of a u...
We introduce the {it natural halting probability} and the {it natural complexity} of a Turing ma...
We study the differences of Martin-Löf random left-c.e. reals and show that for each pair of such re...
AbstractThe present work investigates several questions from a recent survey of Miller and Nies rela...
We consider the statistical mechanical ensemble of bit string histories that are computed by a unive...
Omega numbers, as considered in algorithmic randomness, are by definition real numbers that are equa...
AbstractThe aim of this paper is to provide a probabilistic, but non-quantum, analysis of the Haltin...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
AbstractComputably enumerable (c.e.) reals can be coded by Chaitin machines through their halting pr...
The Turing machine halting problem can be explained by several factors, including arithmetic logic i...
The Kučera–Gács theorem is a landmark result in algorithmic randomness asserting that every real is ...
Given the widespread use of lossless compression algorithms to approximate algorithmic (Kolmogorov-C...
We study the notion of universality probability of a universal prefix-free machine, as introduced by...
Chaitin’s number is the halting probability of a universal prefix-free machine, and although it depe...
A Chaitin Omega number is the halting probability of a universal prefix-free Turing machine. Every O...
Abstract. As a natural example of a 1-random real, Chaitin proposed the halting probability Ω of a u...
We introduce the {it natural halting probability} and the {it natural complexity} of a Turing ma...
We study the differences of Martin-Löf random left-c.e. reals and show that for each pair of such re...
AbstractThe present work investigates several questions from a recent survey of Miller and Nies rela...
We consider the statistical mechanical ensemble of bit string histories that are computed by a unive...
Omega numbers, as considered in algorithmic randomness, are by definition real numbers that are equa...
AbstractThe aim of this paper is to provide a probabilistic, but non-quantum, analysis of the Haltin...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
AbstractComputably enumerable (c.e.) reals can be coded by Chaitin machines through their halting pr...
The Turing machine halting problem can be explained by several factors, including arithmetic logic i...
The Kučera–Gács theorem is a landmark result in algorithmic randomness asserting that every real is ...
Given the widespread use of lossless compression algorithms to approximate algorithmic (Kolmogorov-C...
We study the notion of universality probability of a universal prefix-free machine, as introduced by...