Universal Computably Enumerable Equivalence Relations

Andrews, Uri; Lempp, Steffen; Miller, Joseph S.; Ng, Keng Meng; Mauro, Luca San; Sorbi, Andrea

doi:10.1017/jsl.2013.8

Cited by 51 publications

(119 citation statements)

References 25 publications

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“…Many results of numbering theory can be translated into results on equivalence relations and vice versa, see the recent paper [1] for more details. Numbering theory has been one of the central topics in the Soviet logic school for over 40 years.…”

Section: Effectively Presentable Equivalence Structuresmentioning

confidence: 99%

“…The theory of effective equivalence relations has grown to a rather broad area; we cite [1,18,9] for recent results on this subject. Many results of this paper can be stated in terms of Δ 0 2 -embeddings between effectively presented equivalence structures.…”

Section: Effectively Presentable Equivalence Structuresmentioning

confidence: 99%

“…A computable algebraic structure A is Δ 0 n -categorical if every two computable presentations of A are 0 (n−1) -isomorphic. 1 In contrast to computable categoricity, obtaining a complete classification of Δ 0 n -categoricity in a given class is typically a difficult task. Already for n = 2 and even for algebraically very well understood classes, 1 Here 0 (n+1) stands for the (n + 1)th iterate of the Halting problem.…”

Section: Non-computable Isomorphisms Between Computable Structuresmentioning

confidence: 99%

“…1 In contrast to computable categoricity, obtaining a complete classification of Δ 0 n -categoricity in a given class is typically a difficult task. Already for n = 2 and even for algebraically very well understood classes, 1 Here 0 (n+1) stands for the (n + 1)th iterate of the Halting problem. We note that there are variations of Definition 1.1 such as the notion of relative Δ 0 n -categoricity [3], and also related notions of categoricity spectra [20] and degrees of categoricity [19,10].…”

Section: Non-computable Isomorphisms Between Computable Structuresmentioning

confidence: 99%

See 3 more Smart Citations

OnΔ20-categoricity of equivalence relations

Downey¹,

Melnikov²,

Ng³

2015

Annals of Pure and Applied Logic

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Section: Effectively Presentable Equivalence Structuresmentioning

confidence: 99%

Section: Effectively Presentable Equivalence Structuresmentioning

confidence: 99%

Section: Non-computable Isomorphisms Between Computable Structuresmentioning

confidence: 99%

Section: Non-computable Isomorphisms Between Computable Structuresmentioning

confidence: 99%

See 2 more Smart Citations

OnΔ20-categoricity of equivalence relations

Downey¹,

Melnikov²,

Ng³

2015

Annals of Pure and Applied Logic

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“…Precomplete ceers have been studied in several papers, of which, particularly relevant to our purposes are . For important examples of precomplete ceers that naturally arise in logic, cf., e.g., .…”

Section: Introductionmentioning

confidence: 99%

Weakly precomplete computably enumerable equivalence relations

Badaev

Sorbi

2016

Mathematical Logic Qtrly

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Using computable reducibility $\le$ on equivalence relations, we investigate weakly precomplete ceers (a ``ceer'' is a computably enumerable equivalence relation on the natural numbers), and we compare their class with the more restricted class of precomplete ceers. We show that there are infinitely many isomorphism types of universal (in fact uniformly finitely precomplete) weakly precomplete ceers , that are not precomplete; and there are infinitely many isomorphism types of non-universal weakly precomplete ceers. Whereas the Visser space of a precomplete ceer always contains an infinite effectively discrete subset, there exist weakly precomplete ceers whose Visser spaces do not contain infinite effectively discrete subsets. As a consequence, contrary to precomplete ceers which always yield partitions into effectively inseparable sets, we show that although weakly precomplete ceers always yield partitions into computably inseparable sets, nevertheless there are weakly precomplete ceers for which no equivalence class is creative. Finally, we show that the index set of the precomplete\ud ceers is $\Sigma^0_3$-complete, whereas the index set of the weakly precomplete ceers is $\Pi^0_3$-complete. As a consequence of these results, we also show that the index sets of the uniformly precomplete ceers and of the $e$-complete ceers are $\Sigma_{3}$-complete

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Agreement reducibility

Epstein

Lange

2020

Mathematical Logic Qtrly

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We introduce agreement reducibility and highlight its major features. Given subsets A and B of N, we write A ≤ agree B if there is a total computable function f : N → N satisfying for all e, e , W e ∩ A = W e ∩ A if and only if W f (e) ∩ B = W f (e) ∩ B. We shall discuss the central role N plays in this reducibility and its connection to strong-hyper-hyper-immunity. We shall also compare agreement reducibility to other well-known reducibilities, in particular s 1-and s-reducibility. We came upon this reducibility while studying the computable reducibility of a class of equivalence relations on N based on set-agreement. We end by describing the origin of agreement reducibility and presenting some results in that context.

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Universal Computably Enumerable Equivalence Relations

Abstract: We study computably enumerable equivalence relations (ceers), under the reducibility $R \le S$ if there exists a computable function f such that $x\,R\,y$ if and only if $f\left( x \right)… Show more

Cited by 51 publications

References 25 publications

OnΔ20-categoricity of equivalence relations

OnΔ20-categoricity of equivalence relations

Weakly precomplete computably enumerable equivalence relations

Agreement reducibility

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