IJPAM: Volume 115, No. 1 (2017)
Title
T-SEPERATING SETS FOR COHERENT SEQUENCESAuthors
Martin Dowd60 Mooring Ln.
Daly City, CA 94014, USA
Abstract
In a previous paper the author used methods of Witzany to give a lower bound for the smallest repeat point of a coherent sequence. Here the notion of a T-seperating set is introduced, and the lower bound is improved.History
Received: May 8, 2017
Revised: June 3, 2017
Published: June 29, 2017
AMS Classification, Key Words
AMS Subject Classification: 03E55
Key Words and Phrases: coherent sequence, repeat point
Download Section
Download paper from here.You will need Adobe Acrobat reader. For more information and free download of the reader, see the Adobe Acrobat website.
Bibliography
- 1
- M. Dowd, Iterating Mahlo's operation, Int. J. Pure Appl. Math., 9, no. 4 (2003), 469-512, https://www.hyperonsoft.com/imol.pdf
- 2
- M. Dowd, Improved results in scheme theory, Int. J. Pure Appl. Math., 76, No. 2 (2012), 173-190, https://ijpam.eu/contents/2012-76-2/3/3.pdf
- 3
- M. Dowd, Set chains mod the Pi-1-1 enforceable filte, Int. J. Pure Appl. Math., to appear, https://www.hyperonsoft.com/lbrp.pdf
- 4
- J. Witzany, Possible behaviours of the reflection ordering of stationary sets, J. Symbolic Logic 60 no. 2 (1995), 534-547, doi: https://doi.org/10.2307/2275849.
How to Cite?
DOI: 10.12732/ijpam.v115i1.10 How to cite this paper?Source: International Journal of Pure and Applied Mathematics
ISSN printed version: 1311-8080
ISSN on-line version: 1314-3395
Year: 2017
Volume: 115
Issue: 1
Pages: 123 - 127
Google Scholar; DOI (International DOI Foundation); WorldCAT.
This work is licensed under the Creative Commons Attribution International License (CC BY).