Cupping in the computably enumerable degrees
This thesis is mainly concerned with the cupping property in the computably enumerable (c.e.) degrees. In particular, we study major sub-degrees, n-cuppable degrees and the quotient structure R/Ncup. In the first part, we present a direct construction of a cuppable high c.e. h with a low major sub-...
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Nanyang Technological University
2023
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sg-ntu-dr.10356-1655582023-04-04T02:58:00Z Cupping in the computably enumerable degrees Tran, Hong Hanh Wu Guohua School of Physical and Mathematical Sciences guohua@ntu.edu.sg Science::Mathematics::Mathematical logic This thesis is mainly concerned with the cupping property in the computably enumerable (c.e.) degrees. In particular, we study major sub-degrees, n-cuppable degrees and the quotient structure R/Ncup. In the first part, we present a direct construction of a cuppable high c.e. h with a low major sub-degree l such that h>= a for a given c.e. degree a. In the second part, we generalize the technique of Bie and Wu, used in the construction of a minimal pair in R/Ncup which is also a minimal pair in M/Ncup, to construct three incomplete c.e. degrees which are 2-cuppable but not 3-cuppable. This result will be directly generalized to arbitrary n>3 c.e. degrees. Consequently, for any n>0, there are n degrees which are (n-1)-cuppable but not n-cuppable. In the third part, using Bie and Wu's technique, we prove a claim by Li, Wu and Yang that the diamond lattice can be embedded in R/Ncup preserving 0 and 1. Doctor of Philosophy 2023-03-30T00:51:19Z 2023-03-30T00:51:19Z 2023 Thesis-Doctor of Philosophy Tran, H. H. (2023). Cupping in the computably enumerable degrees. Doctoral thesis, Nanyang Technological University, Singapore. https://hdl.handle.net/10356/165558 https://hdl.handle.net/10356/165558 10.32657/10356/165558 en This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License (CC BY-NC 4.0). application/pdf Nanyang Technological University |
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Science::Mathematics::Mathematical logic Tran, Hong Hanh Cupping in the computably enumerable degrees |
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This thesis is mainly concerned with the cupping property in the computably enumerable (c.e.) degrees. In particular, we study major sub-degrees, n-cuppable degrees and the quotient structure R/Ncup. In the first part, we present a direct construction of a cuppable high c.e. h with a low major sub-degree l such that h>= a for a given c.e. degree a. In the second part, we generalize the technique of Bie and Wu, used in the construction of a minimal pair in R/Ncup which is also a minimal pair in M/Ncup, to construct three incomplete c.e. degrees which are 2-cuppable but not 3-cuppable. This result will be directly generalized to arbitrary n>3 c.e. degrees. Consequently, for any n>0, there are n degrees which are (n-1)-cuppable but not n-cuppable. In the third part, using Bie and Wu's technique, we prove a claim by Li, Wu and Yang that the diamond lattice can be embedded in R/Ncup preserving 0 and 1. |
| author2 |
Wu Guohua |
| author_facet |
Wu Guohua Tran, Hong Hanh |
| format |
Thesis-Doctor of Philosophy |
| author |
Tran, Hong Hanh |
| author_sort |
Tran, Hong Hanh |
| title |
Cupping in the computably enumerable degrees |
| title_short |
Cupping in the computably enumerable degrees |
| title_full |
Cupping in the computably enumerable degrees |
| title_fullStr |
Cupping in the computably enumerable degrees |
| title_full_unstemmed |
Cupping in the computably enumerable degrees |
| title_sort |
cupping in the computably enumerable degrees |
| publisher |
Nanyang Technological University |
| publishDate |
2023 |
| url |
https://hdl.handle.net/10356/165558 |
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1764208147931594752 |