The Structure of d.r.e. Degrees

Yong Liu
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Abstract

Abstract This dissertation is highly motivated by d.r.e. Nondensity Theorem, which is interesting in two perspectives. One is that it contrasts Sacks Density Theorem, and hence shows that the structures of r.e. degrees and d.r.e. degrees are different. The other is to investigate what other properties a maximal degree can have. In Chapter 1, we briefly review the backgrounds of Recursion Theory which motivate the topics of this dissertation. In Chapter 2, we introduce the notion of $(m,n)$ -cupping degree. It is closely related to the notion of maximal d.r.e. degree. In fact, a $(2,2)$ -cupping degree is maximal d.r.e. degree. We then prove that there exists an isolated $(2,\omega )$ -cupping degree by combining strategies for maximality and isolation with some efforts. Chapter 3 is part of a joint project with Steffen Lempp, Yiqun Liu, Keng Meng Ng, Cheng Peng, and Guohua Wu. In this chapter, we prove that any finite boolean algebra can be embedded into d.r.e. degrees as a final segment. We examine the proof of d.r.e. Nondensity Theorem and make developments to the technique to make it work for our theorem. The goal of the project is to see what lattice can be embedded into d.r.e. degrees as a final segment, as we observe that the technique has potential be developed further to produce other interesting results. Abstract prepared by Yong Liu. E-mail: liuyong0112@nju.edu.cn
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本文的研究灵感来自于d.r.e.非密度定理,该定理在两个方面都很有趣。其一,它对比了Sacks密度定理,从而表明r.e.度和d.r.e.度的结构是不同的。另一个是研究极大度还可以有哪些其他性质。在第一章中,我们简要回顾了激发本文主题的递归理论的背景。在第二章中,我们引入了$(m,n)$ -拔罐度的概念。它与最大d.r.e.度的概念密切相关。事实上,$(2,2)$ -拔罐度是最大的d.r.e.度。然后,通过将极大性策略和隔离策略结合起来,用一定的努力证明了存在一个孤立的$(2,\ ω)$ -拔罐度。第3章是与Steffen Lempp、Liu Yiqun、eng Meng Ng、Cheng Peng和Guohua Wu合作项目的一部分。在本章中,我们证明了任何有限布尔代数都可以作为最终段嵌入到d.r.e.度中。我们研究了d.r.e.非密度定理的证明,并对该技术进行了发展,使其适用于我们的定理。该项目的目标是看看什么晶格可以嵌入到d.r.e.度作为最后的部分,因为我们观察到该技术有潜力进一步发展,以产生其他有趣的结果。摘要:刘勇编写。电子邮件:liuyong0112@nju.edu.cn
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POUR-EL’S LANDSCAPE CATEGORICAL QUANTIFICATION POINCARÉ-WEYL’S PREDICATIVITY: GOING BEYOND A TOPOLOGICAL APPROACH TO UNDEFINABILITY IN ALGEBRAIC EXTENSIONS OF John MacFarlane, Philosophical Logic: A Contemporary Introduction, Routledge Contemporary Introductions to Philosophy, Routledge, New York, and London, 2021, xx + 238 pp.
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