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Exactness of Proximal Group Homomorphisms

Year 2022, , 652 - 655, 27.12.2022
https://doi.org/10.17776/csj.1126326

Abstract

This research introduces groups in proximity spaces which endowed with a proximity relation. Two penultimate choices for such relations are the Efremovic (EF) proximity relation and its extension, namely, the descriptive EF-proximity relation. There is a strong relationship between sets (groups) and set (group) descriptions. Therefore, in this paper we consider this relationship via exactness of descriptive homomorphisms between ordinary descriptive groups and meta-descriptive groups. The definition of a short exact sequence of descriptive homomorphisms is given. Then, results were obtained giving the relationships between the two short exact sequences.

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Thanks

The author wish to thank the anonymous reviewers for their valuable suggestions.

References

  • [1] Peters, J.F., İnan, E., Öztürk, M.A., Spatial and descriptive isometries in proximity spaces, Gen. Math. Notes 21(2) (2014) 1-10.
  • [2] Peters, J.F., İnan, E., Öztürk, M.A., Monoids in proximal Banach spaces, Int. J. Algebra 8(18) (2014) 869-872.
  • [3] Peters, J.F., Naimpally, S., Applications of near sets, Notes of the Amer. Math. Soc. 59(4) (2012) 536-542.
  • [4] Peters, J.F., Near sets: An introduction, Math. Comput. Sci. 7(1) (2013) 3-9.
  • [5] Efremovic, V.A., The geometry of proximity I (in Russian), Mat. Sbornik N. S. 31(73) (1952) 189-200.
  • [6] Kasch, F., Modules and Rings, Academic Press Inc. Ltd., London, 1982.
  • [7] Kovar, M.M., A new causal topology and why the universe is co-compact, arXive:1112.0817 [math-ph] (2011) 1-15.
  • [8] Peters, J.F., Local near sets: Pattern discovery in proximity spaces, Math. Comput. Sci. 7(1) (2013) 87-106.
  • [9] Cech, E., Topological Spaces, John Wiley & Sons Ltd., London, 1966.
  • [10] Peters, J.F., Öztürk, M.A., Uçkun, M., Exactness of Proximal Groupoid Homomorphisms, Adıyaman University Journal of Science 5(1) (2015) 1-13.
Year 2022, , 652 - 655, 27.12.2022
https://doi.org/10.17776/csj.1126326

Abstract

Project Number

-

References

  • [1] Peters, J.F., İnan, E., Öztürk, M.A., Spatial and descriptive isometries in proximity spaces, Gen. Math. Notes 21(2) (2014) 1-10.
  • [2] Peters, J.F., İnan, E., Öztürk, M.A., Monoids in proximal Banach spaces, Int. J. Algebra 8(18) (2014) 869-872.
  • [3] Peters, J.F., Naimpally, S., Applications of near sets, Notes of the Amer. Math. Soc. 59(4) (2012) 536-542.
  • [4] Peters, J.F., Near sets: An introduction, Math. Comput. Sci. 7(1) (2013) 3-9.
  • [5] Efremovic, V.A., The geometry of proximity I (in Russian), Mat. Sbornik N. S. 31(73) (1952) 189-200.
  • [6] Kasch, F., Modules and Rings, Academic Press Inc. Ltd., London, 1982.
  • [7] Kovar, M.M., A new causal topology and why the universe is co-compact, arXive:1112.0817 [math-ph] (2011) 1-15.
  • [8] Peters, J.F., Local near sets: Pattern discovery in proximity spaces, Math. Comput. Sci. 7(1) (2013) 87-106.
  • [9] Cech, E., Topological Spaces, John Wiley & Sons Ltd., London, 1966.
  • [10] Peters, J.F., Öztürk, M.A., Uçkun, M., Exactness of Proximal Groupoid Homomorphisms, Adıyaman University Journal of Science 5(1) (2015) 1-13.
There are 10 citations in total.

Details

Primary Language English
Subjects Mathematical Sciences
Journal Section Natural Sciences
Authors

Mehmet Ali Öztürk 0000-0002-1721-1053

Project Number -
Publication Date December 27, 2022
Submission Date June 6, 2022
Acceptance Date September 1, 2022
Published in Issue Year 2022

Cite

APA Öztürk, M. A. (2022). Exactness of Proximal Group Homomorphisms. Cumhuriyet Science Journal, 43(4), 652-655. https://doi.org/10.17776/csj.1126326