AbstractComputably enumerable (c.e.) reals can be coded by Chaitin machines through their halting probabilities. Tuning Solovay's construction of a Chaitin universal machine for which ZFC (if arithmetically sound) cannot determine any single bit of the binary expansion of its halting probability, we show that every c.e.~random real is the halting probability of a universal Chaitin machine for which ZFC cannot determine more than its initial block of 1 bits—as soon as you get a 0, it is all over. Finally, a constructive version of Chaitin information-theoretic incompleteness theorem is proven
The combined universal probability m(D) of strings x in sets D is close to max \m(x) over x in D: th...
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...
AbstractComputably enumerable (c.e.) reals can be coded by Chaitin machines through their halting pr...
Chaitin’s number is the halting probability of a universal prefix-free machine, and although it depe...
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...
AbstractA real α is computably enumerable if it is the limit of a computable, increasing, converging...
AbstractIn this paper we prove Chaitin's “heuristic principle,” the theorems of a finitely-specified...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
AbstractWe obtain some dramatic results using statistical mechanics-thermodynamics kinds of argument...
AbstractWe give a general theorem that provides examples of n-random reals à la Chaitin, for every n...
AbstractWe show that the elementary theory of the structure of the Solovay degrees of computably enu...
The halting probability of a Turing machine is the probability that the machine will halt if it star...
AbstractThe present work investigates several questions from a recent survey of Miller and Nies rela...
The combined universal probability m(D) of strings x in sets D is close to max \m(x) over x in D: th...
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...
AbstractComputably enumerable (c.e.) reals can be coded by Chaitin machines through their halting pr...
Chaitin’s number is the halting probability of a universal prefix-free machine, and although it depe...
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...
AbstractA real α is computably enumerable if it is the limit of a computable, increasing, converging...
AbstractIn this paper we prove Chaitin's “heuristic principle,” the theorems of a finitely-specified...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
AbstractWe obtain some dramatic results using statistical mechanics-thermodynamics kinds of argument...
AbstractWe give a general theorem that provides examples of n-random reals à la Chaitin, for every n...
AbstractWe show that the elementary theory of the structure of the Solovay degrees of computably enu...
The halting probability of a Turing machine is the probability that the machine will halt if it star...
AbstractThe present work investigates several questions from a recent survey of Miller and Nies rela...
The combined universal probability m(D) of strings x in sets D is close to max \m(x) over x in D: th...
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...