AbstractThe present work investigates several questions from a recent survey of Miller and Nies related to Chaitin's Ω numbers and their dependence on the underlying universal machine. Furthermore, the notion ΩU[X]=∑p:U(p)↓∈X2-|p| is studied for various sets X and universal machines U. A universal machine U is constructed such that for all x, ΩU[{x}]=21-H(x). For such a universal machine there exists a co-r.e. set X such that ΩU[X] is neither left-r.e. nor Martin-Löf random. Furthermore, one of the open problems of Miller and Nies is answered completely by showing that there is a sequence Un of universal machines such that the truth-table degrees of the ΩUn form an antichain. Finally, it is shown that the members of hyperimmune-free Turing ...
AbstractSchnorr randomness is a notion of algorithmic randomness for real numbers closely related to...
This thesis establishes results in several different areas of computability theory. The first chapt...
Avigad introduced the notion of UD–randomness based in Weyl’s 1916 definition of uniform distributio...
The present work investigates several questions from a recent survey of Miller and Nies related to C...
AbstractThe present work investigates several questions from a recent survey of Miller and Nies rela...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
Abstract. As a natural example of a 1-random real, Chaitin proposed the halting probability Ω of a u...
We study the notion of universality probability of a universal prefix-free machine, as introduced by...
AbstractIn this paper we introduce the notion of ε-universal prefix-free Turing machine (ε is a comp...
Abstract. We investigate the truth-table degrees of (co-)c.e. sets, in partic-ular, sets of random s...
We introduce the {it natural halting probability} and the {it natural complexity} of a Turing ma...
Abstract. Every K-trivial set is computable from an incomplete Martin-Löf random set, i.e., a Marti...
Abstract. Every K-trivial set is computable from an incomplete Martin-Löf random set, i.e., a Marti...
We investigate the truth-table degrees of (co-)c.e.\ sets, in particular,sets of random strings. It ...
This thesis establishes significant new results in the area of algorithmic randomness. These results...
AbstractSchnorr randomness is a notion of algorithmic randomness for real numbers closely related to...
This thesis establishes results in several different areas of computability theory. The first chapt...
Avigad introduced the notion of UD–randomness based in Weyl’s 1916 definition of uniform distributio...
The present work investigates several questions from a recent survey of Miller and Nies related to C...
AbstractThe present work investigates several questions from a recent survey of Miller and Nies rela...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
Abstract. As a natural example of a 1-random real, Chaitin proposed the halting probability Ω of a u...
We study the notion of universality probability of a universal prefix-free machine, as introduced by...
AbstractIn this paper we introduce the notion of ε-universal prefix-free Turing machine (ε is a comp...
Abstract. We investigate the truth-table degrees of (co-)c.e. sets, in partic-ular, sets of random s...
We introduce the {it natural halting probability} and the {it natural complexity} of a Turing ma...
Abstract. Every K-trivial set is computable from an incomplete Martin-Löf random set, i.e., a Marti...
Abstract. Every K-trivial set is computable from an incomplete Martin-Löf random set, i.e., a Marti...
We investigate the truth-table degrees of (co-)c.e.\ sets, in particular,sets of random strings. It ...
This thesis establishes significant new results in the area of algorithmic randomness. These results...
AbstractSchnorr randomness is a notion of algorithmic randomness for real numbers closely related to...
This thesis establishes results in several different areas of computability theory. The first chapt...
Avigad introduced the notion of UD–randomness based in Weyl’s 1916 definition of uniform distributio...