The strong weak truth table (sw) reducibility was suggested by Downey, Hirschfeldt, and LaForte as a measure of relative randomness, alternative to the Solovay reducibility. It also occurs naturally in proofs in classical computability theory as well as in the recent work of Soare, Nabutovsky, and Weinberger on applications of computability to differential geometry. We study the sw-degrees of c.e. reals and construct a c.e. real which has no random c.e. real (i.e., Ω number) sw-above it
AbstractSchnorr randomness is a notion of algorithmic randomness for real numbers closely related to...
AbstractThe Turing degree of a real number is defined as the Turing degree of its binary expansion. ...
AbstractWe show that the elementary theory of the structure of the Solovay degrees of computably enu...
The strong weak truth table (sw) reducibility was suggested by Downey, Hirschfeldt, and LaForte as a...
Abstract. We investigate the connections between the complexity of a c.e. set, as calibrated by its ...
AbstractWe show that there exists a real α such that, for all reals β, if α is linear reducible to β...
We study the weak truth-table and truth-table degrees of the images of subsets of computable structu...
We show that there exists a real α such that, for all reals β, if α is linear reducible to β (α≤ℓβ, ...
AbstractThe computable Lipschitz reducibility was introduced by Downey, Hirschfeldt and LaForte unde...
AbstractA real is Martin-Löf (Schnorr) random if it does not belong to any effectively presented nul...
We investigate the truth-table degrees of (co-)c.e.\ sets, in particular,sets of random strings. It ...
This paper examines the constructive Hausdorff and packing dimensions of weak truth-table degrees. T...
Abstract. We investigate the truth-table degrees of (co-)c.e. sets, in partic-ular, sets of random s...
AbstractWe show that for any real number, the class of real numbers less random than it, in the sens...
Abstract. The computable Lipschitz reducibility was introduced by Downey, Hirschfeldt and LaForte un...
AbstractSchnorr randomness is a notion of algorithmic randomness for real numbers closely related to...
AbstractThe Turing degree of a real number is defined as the Turing degree of its binary expansion. ...
AbstractWe show that the elementary theory of the structure of the Solovay degrees of computably enu...
The strong weak truth table (sw) reducibility was suggested by Downey, Hirschfeldt, and LaForte as a...
Abstract. We investigate the connections between the complexity of a c.e. set, as calibrated by its ...
AbstractWe show that there exists a real α such that, for all reals β, if α is linear reducible to β...
We study the weak truth-table and truth-table degrees of the images of subsets of computable structu...
We show that there exists a real α such that, for all reals β, if α is linear reducible to β (α≤ℓβ, ...
AbstractThe computable Lipschitz reducibility was introduced by Downey, Hirschfeldt and LaForte unde...
AbstractA real is Martin-Löf (Schnorr) random if it does not belong to any effectively presented nul...
We investigate the truth-table degrees of (co-)c.e.\ sets, in particular,sets of random strings. It ...
This paper examines the constructive Hausdorff and packing dimensions of weak truth-table degrees. T...
Abstract. We investigate the truth-table degrees of (co-)c.e. sets, in partic-ular, sets of random s...
AbstractWe show that for any real number, the class of real numbers less random than it, in the sens...
Abstract. The computable Lipschitz reducibility was introduced by Downey, Hirschfeldt and LaForte un...
AbstractSchnorr randomness is a notion of algorithmic randomness for real numbers closely related to...
AbstractThe Turing degree of a real number is defined as the Turing degree of its binary expansion. ...
AbstractWe show that the elementary theory of the structure of the Solovay degrees of computably enu...