A Chaitin Omega number is the halting probability of a universal prefix-free Turing machine. Every Omega number is simultaneously computably enumerable (the limit of a computable, increasing, converging sequence of rationals), and algorithmically random (its binary expansion is an algorithmic random sequence), hence uncomputable. The value of an Omega number is highly machine-dependent. In general, no more than finitely many scattered bits of the binary expansion of an Omega number can be exactly computed; but, in some cases, it is possible to prove that no bit can be computed. In this paper we will simplify and improve both the method and its correctness proof proposed in an earlier paper, and we will compute the exact approximations of tw...
AbstractIn this paper we introduce the notion of ε-universal prefix-free Turing machine (ε is a comp...
To appear in Information Processing Letters.International audienceWe answer two questions posed by C...
Given the widespread use of lossless compression algorithms to approximate algorithmic (Kolmogorov-C...
Omega numbers, as considered in algorithmic randomness, are by definition real numbers that are equa...
Abstract. A real number which equals the probability that a universal prefix-free machine halts when...
The halting probability of a Turing machine is the probability that the machine will halt if it star...
Abstract. As a natural example of a 1-random real, Chaitin proposed the halting probability Ω of a u...
Chaitin’s number is the halting probability of a universal prefix-free machine, and although it depe...
We introduce the {it natural halting probability} and the {it natural complexity} of a Turing ma...
103 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1984.An (omega)-language is a set ...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
We study the notion of universality probability of a universal prefix-free machine, as introduced by...
Automata over infinite words, also known as omega-automata, play a key role in the verification and ...
A real is computable if it is the limit of a computable, increasing, computably converging sequence ...
International audienceWe extend the concept of factorization on finite words to omega-rational langu...
AbstractIn this paper we introduce the notion of ε-universal prefix-free Turing machine (ε is a comp...
To appear in Information Processing Letters.International audienceWe answer two questions posed by C...
Given the widespread use of lossless compression algorithms to approximate algorithmic (Kolmogorov-C...
Omega numbers, as considered in algorithmic randomness, are by definition real numbers that are equa...
Abstract. A real number which equals the probability that a universal prefix-free machine halts when...
The halting probability of a Turing machine is the probability that the machine will halt if it star...
Abstract. As a natural example of a 1-random real, Chaitin proposed the halting probability Ω of a u...
Chaitin’s number is the halting probability of a universal prefix-free machine, and although it depe...
We introduce the {it natural halting probability} and the {it natural complexity} of a Turing ma...
103 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1984.An (omega)-language is a set ...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
We study the notion of universality probability of a universal prefix-free machine, as introduced by...
Automata over infinite words, also known as omega-automata, play a key role in the verification and ...
A real is computable if it is the limit of a computable, increasing, computably converging sequence ...
International audienceWe extend the concept of factorization on finite words to omega-rational langu...
AbstractIn this paper we introduce the notion of ε-universal prefix-free Turing machine (ε is a comp...
To appear in Information Processing Letters.International audienceWe answer two questions posed by C...
Given the widespread use of lossless compression algorithms to approximate algorithmic (Kolmogorov-C...