Chaitin’s number is the halting probability of a universal prefix-free machine, and although it depends on the underlying enumeration of prefix-free machines, it is always Turing-complete. It can be observed, in fact, that for every computably enumerable (c.e.) real �, there exists a Turing functional via which computes �, and such that the number of bits of that are needed for the computation of the first n bits of � (i.e. the use on argument n) is bounded above by a computable function h(n) = n + o (n). We characterise the asymptotic upper bounds on the use of Chaitin’s in oracle computations of halting probabilities (i.e. c.e. reals). We show that the following two conditions are equivalent for any computable function h such that h(n)
A Chaitin Omega number is the halting probability of a universal prefix-free Turing machine. Every O...
Computability in the limit represents the non-plus-ultra of constructive describability. It is well ...
The Kučera–Gács theorem is a landmark result in algorithmic randomness asserting that every real is ...
AbstractComputably enumerable (c.e.) reals can be coded by Chaitin machines through their halting pr...
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...
If a computer is given access to an oracle—the characteristic function of a set whose membership rel...
The combined universal probability m(D) of strings x in sets D is close to max \m(x) over x in D: th...
We introduce the {it natural halting probability} and the {it natural complexity} of a Turing ma...
A real is computable if it is the limit of a computable, increasing, computably converging sequence ...
AbstractA real α is called recursively enumerable if it is the limit of a recursive, increasing, con...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
AbstractWe give a general theorem that provides examples of n-random reals à la Chaitin, for every n...
AbstractA real α is computably enumerable if it is the limit of a computable, increasing, converging...
AbstractThe present work investigates several questions from a recent survey of Miller and Nies rela...
A Chaitin Omega number is the halting probability of a universal prefix-free Turing machine. Every O...
Computability in the limit represents the non-plus-ultra of constructive describability. It is well ...
The Kučera–Gács theorem is a landmark result in algorithmic randomness asserting that every real is ...
AbstractComputably enumerable (c.e.) reals can be coded by Chaitin machines through their halting pr...
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...
If a computer is given access to an oracle—the characteristic function of a set whose membership rel...
The combined universal probability m(D) of strings x in sets D is close to max \m(x) over x in D: th...
We introduce the {it natural halting probability} and the {it natural complexity} of a Turing ma...
A real is computable if it is the limit of a computable, increasing, computably converging sequence ...
AbstractA real α is called recursively enumerable if it is the limit of a recursive, increasing, con...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
AbstractWe give a general theorem that provides examples of n-random reals à la Chaitin, for every n...
AbstractA real α is computably enumerable if it is the limit of a computable, increasing, converging...
AbstractThe present work investigates several questions from a recent survey of Miller and Nies rela...
A Chaitin Omega number is the halting probability of a universal prefix-free Turing machine. Every O...
Computability in the limit represents the non-plus-ultra of constructive describability. It is well ...
The Kučera–Gács theorem is a landmark result in algorithmic randomness asserting that every real is ...