Degrees containing members of thin II1 classes are dense and co-dense
In [Countable thin II1 classes, Ann. Pure Appl. Logic 59 (1993) 79-139], Cenzer, Downey, Jockusch and Shore proved the density of degrees (not necessarily c.e.) containing members of countable thin II1 classes. In the same paper, Cenzer et al. also proved the existence of degrees containing no membe...
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sg-ntu-dr.10356-1422982020-06-18T07:56:49Z Degrees containing members of thin II1 classes are dense and co-dense Downey, Rodney G. Wu, Guohua Yang, Yue School of Physical and Mathematical Sciences Science::Mathematics Π10 Classes Turing Degrees In [Countable thin II1 classes, Ann. Pure Appl. Logic 59 (1993) 79-139], Cenzer, Downey, Jockusch and Shore proved the density of degrees (not necessarily c.e.) containing members of countable thin II1 classes. In the same paper, Cenzer et al. also proved the existence of degrees containing no members of thin II1 classes. We will prove in this paper that the c.e. degrees containing no members of thin II1 classes are dense in the c.e. degrees. We will also prove that the c.e. degrees containing members of thin II1 classes are dense in the c.e. degrees, improving the result of Cenzer et al. mentioned above. Thus, we obtain a new natural subclass of c.e. degrees which are both dense and co-dense in the c.e. degrees, while the other such class is the class of branching c.e. degrees (See [P. Fejer, The density of the nonbranching degrees, Ann. Pure Appl. Logic 24 (1983) 113-130] for nonbranching degrees and [T. A. Slaman, The density of infima in the recursively enumerable degrees. MOE (Min. of Education, S’pore) 2020-06-18T07:56:49Z 2020-06-18T07:56:49Z 2018 Journal Article Downey, R. G., Wu, G., & Yang, Y. (2018). Degrees containing members of thin II1 classes are dense and co-dense. Journal of Mathematical Logic, 18(1), 1850001-. doi:10.1142/S0219061318500010 0219-0613 https://hdl.handle.net/10356/142298 10.1142/S0219061318500010 2-s2.0-85038924728 1 18 en Journal of Mathematical Logic © 2018 World Scientific Publishing Company. |
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Science::Mathematics Π10 Classes Turing Degrees Downey, Rodney G. Wu, Guohua Yang, Yue Degrees containing members of thin II1 classes are dense and co-dense |
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In [Countable thin II1 classes, Ann. Pure Appl. Logic 59 (1993) 79-139], Cenzer, Downey, Jockusch and Shore proved the density of degrees (not necessarily c.e.) containing members of countable thin II1 classes. In the same paper, Cenzer et al. also proved the existence of degrees containing no members of thin II1 classes. We will prove in this paper that the c.e. degrees containing no members of thin II1 classes are dense in the c.e. degrees. We will also prove that the c.e. degrees containing members of thin II1 classes are dense in the c.e. degrees, improving the result of Cenzer et al. mentioned above. Thus, we obtain a new natural subclass of c.e. degrees which are both dense and co-dense in the c.e. degrees, while the other such class is the class of branching c.e. degrees (See [P. Fejer, The density of the nonbranching degrees, Ann. Pure Appl. Logic 24 (1983) 113-130] for nonbranching degrees and [T. A. Slaman, The density of infima in the recursively enumerable degrees. |
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School of Physical and Mathematical Sciences |
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School of Physical and Mathematical Sciences Downey, Rodney G. Wu, Guohua Yang, Yue |
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Article |
| author |
Downey, Rodney G. Wu, Guohua Yang, Yue |
| author_sort |
Downey, Rodney G. |
| title |
Degrees containing members of thin II1 classes are dense and co-dense |
| title_short |
Degrees containing members of thin II1 classes are dense and co-dense |
| title_full |
Degrees containing members of thin II1 classes are dense and co-dense |
| title_fullStr |
Degrees containing members of thin II1 classes are dense and co-dense |
| title_full_unstemmed |
Degrees containing members of thin II1 classes are dense and co-dense |
| title_sort |
degrees containing members of thin ii1 classes are dense and co-dense |
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2020 |
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https://hdl.handle.net/10356/142298 |
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