AbstractLachlan observed that any nonzero d.c.e. degree bounds a nonzero c.e. degree. In this paper, we study the c.e. predecessors of d.c.e. degrees, and prove that given a nonzero d.c.e. degree a, there is a c.e. degree b below a and a high d.c.e. degree d>b such that b bounds all the c.e. degrees below d. This result gives a unified approach to some seemingly unrelated results. In particular, it has the following two known theorems as corollaries: (1) there is a low c.e. degree isolating a high d.c.e. degree [S. Ishmukhametov, G. Wu, Isolation and the high/low hierarchy, Arch. Math. Logic 41 (2002) 259–266]; (2) there is a high d.c.e. degree bounding no minimal pairs [C.T. Chong, A. Li, Y. Yang, The existence of high nonbounding degrees ...
Abstract. This paper extends Post’s programme to finite levels of the Ershov hierarchy of ∆2 sets. O...
In this article, we investigate model-theoretic properties of various Turing degree structures in th...
© 2018 - IOS Press and the authors. All rights reserved. In 1971 B. Cooper proved that there exists ...
AbstractLachlan observed that any nonzero d.c.e. degree bounds a nonzero c.e. degree. In this paper,...
© 2018, Pleiades Publishing, Ltd. Questions of definability of computably enumerable degrees in the ...
This thesis is concerned with three special properties of Turing degree structure and the Ershov hie...
In this paper we investigate questions about the definability of classes of n-computably enumerable ...
We examine the relationship between the CEA hierarchy and the Ershov hierarchy within $\Delta_2^0$ T...
In this paper we prove the following theorem: For every notation of a constructive ordinal there exi...
We show that there exist downwards properly \Sigma^0_2 (in fact noncuppable) e-degrees that are not...
Generalizations to various levels of Ershov's hierarchy of the relationship between n-computable enu...
This paper continues the project, initiated in (Arslanov, Cooper and Kalimullin 2003) [3], of descri...
This paper continues the project, initiated in [ACK], of describing general conditions under which r...
Abstract. An n-r.e. set can be defined as the symmetric difference of n recursively enumerable sets....
© 2020, The Author(s). Computably enumerable equivalence relations (ceers) received a lot of attenti...
Abstract. This paper extends Post’s programme to finite levels of the Ershov hierarchy of ∆2 sets. O...
In this article, we investigate model-theoretic properties of various Turing degree structures in th...
© 2018 - IOS Press and the authors. All rights reserved. In 1971 B. Cooper proved that there exists ...
AbstractLachlan observed that any nonzero d.c.e. degree bounds a nonzero c.e. degree. In this paper,...
© 2018, Pleiades Publishing, Ltd. Questions of definability of computably enumerable degrees in the ...
This thesis is concerned with three special properties of Turing degree structure and the Ershov hie...
In this paper we investigate questions about the definability of classes of n-computably enumerable ...
We examine the relationship between the CEA hierarchy and the Ershov hierarchy within $\Delta_2^0$ T...
In this paper we prove the following theorem: For every notation of a constructive ordinal there exi...
We show that there exist downwards properly \Sigma^0_2 (in fact noncuppable) e-degrees that are not...
Generalizations to various levels of Ershov's hierarchy of the relationship between n-computable enu...
This paper continues the project, initiated in (Arslanov, Cooper and Kalimullin 2003) [3], of descri...
This paper continues the project, initiated in [ACK], of describing general conditions under which r...
Abstract. An n-r.e. set can be defined as the symmetric difference of n recursively enumerable sets....
© 2020, The Author(s). Computably enumerable equivalence relations (ceers) received a lot of attenti...
Abstract. This paper extends Post’s programme to finite levels of the Ershov hierarchy of ∆2 sets. O...
In this article, we investigate model-theoretic properties of various Turing degree structures in th...
© 2018 - IOS Press and the authors. All rights reserved. In 1971 B. Cooper proved that there exists ...