低ce集的分类和Ershov层次

IF 0.4 4区数学 Q4 LOGIC Mathematical Logic Quarterly Pub Date : 2023-09-11 DOI:10.1002/malq.202300020

Marat Faizrahmanov

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引用次数: 0

摘要

本文证明了低c.e.集的图灵跳跃的几个结果。我们证明了只有Ershov层次的Δ-levels可以适当地包含c.e.集的图灵跳跃，并且存在一个任意大的可计算序数，其正规符号使得对应的Δ-level适合于某些c.e.集的图灵跳跃。接下来，我们将跳跃可追溯性的概念推广到Σ α−1的跳跃可追溯性 $\Sigma ^{-1}_{\alpha }$ -和Δ α−1 $\Delta ^{-1}_{\alpha }$ -界对于每一个无限可计算序数α。已知跳跃可溯性和超低性在c.e.集合上重合，并证明了对于每一个无限可计算序数α，跳跃可溯性为Σ α−1 $\Sigma ^{-1}_{\alpha }$ -或Δ α−1 $\Delta ^{-1}_{\alpha }$ 一个c.e.集合a的-界等价于a '∈Δ α−1 $A^{\prime }\in \Delta ^{-1}_{\alpha }$ ．最后，我们考虑了广义真值表的可约性≤g t t (α) $\leqslant _{gtt(\alpha )}$ 并证明对于每一个集合a(不一定是c.e.集合的图灵跳跃)和每一个极限可计算序数α， a∈Δ α−1 $A\in \Delta ^{-1}_{\alpha }$ iff A≤g t t (α)∑' $A\leqslant _{gtt(\alpha )}\varnothing ^{\prime }$ ．

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A classification of low c.e. sets and the Ershov hierarchy

In this paper, we prove several results about the Turing jumps of low c.e. sets. We show that only Δ-levels of the Ershov Hierarchy can properly contain the Turing jumps of c.e. sets and that there exists an arbitrarily large computable ordinal with a normal notation such that the corresponding Δ-level is proper for the Turing jump of some c.e. set. Next, we generalize the notion of jump traceability to the jump traceability with $Σ_{α}^{- 1}$ - and $Δ_{α}^{- 1}$ -bound for every infinite computable ordinal α. It is known that jump traceability and superlowness coincide on the c.e. sets and we show that for every infinite computable ordinal α, jump traceability with $Σ_{α}^{- 1}$ - or $Δ_{α}^{- 1}$ -bound of a c.e. set A is equivalent to the fact that $A^{'} \in Δ_{α}^{- 1}$ . Finally, we consider the generalized truth-table reducibilities $⩽_{g t t (α)}$ and prove that for every (not necessarily the Turing jump of a c.e. set) set A and every limit computable ordinal α, $A \in Δ_{α}^{- 1}$ iff $A ⩽_{g t t (α)} ⌀^{'}$ .

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来源期刊

Mathematical Logic Quarterly 数学-数学

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0.60

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0.00%

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审稿时长

>12 weeks

期刊介绍： Mathematical Logic Quarterly publishes original contributions on mathematical logic and foundations of mathematics and related areas, such as general logic, model theory, recursion theory, set theory, proof theory and constructive mathematics, algebraic logic, nonstandard models, and logical aspects of theoretical computer science.

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