In this paper the notion of fuzzy semi-P-spaces is introduced and studied. It is established that the class of fuzzy semi-P-spaces lies between the classes of fuzzy-P-spaces and fuzzy almost-P-spaces. It is established that fuzzy fuzzy σ-nowhere dense sets in fuzzy Semi-P-spaces are fuzzy Semi-closed sets and fuzzy Gδ-sets and fuzzy Fσ-sets are fuzzy σ-nowhere sets in fuzzy hyperconnected and semi-P-spaces are fuzzy dense sets. Also it is found that fuzzy residual sets in fuzzy globally disconnected and fuzzy Semi-P-spaces are fuzzy semi-open sets and fuzzy Gδ-sets in fuzzy perfectly disconnected and fuzzy Semi-P-spaces are fuzzy pre-open sets. Also it is established that fuzzy hyperconnected and semi-P-spaces are fuzzy irresolvable spaces. The conditions for fuzzy semi- P-spaces to become fuzzy σ-Baire spaces and fuzzy Baire spaces are obtained. The conditions for the fuzzy semi-P-spaces to become fuzzy strongly irresolvable spaces are also obtained in this paper.
| Published in | Pure and Applied Mathematics Journal (Volume 11, Issue 1) |
| DOI | 10.11648/j.pamj.20221101.12 |
| Page(s) | 20-27 |
| Creative Commons |
This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited. |
| Copyright |
Copyright © The Author(s), 2022. Published by Science Publishing Group |
Fuzzy Gδ-set, Fuzzy Fσ-set, Fuzzy Semi-open Set, Fuzzy Almost P-space, Fuzzy σ-Baire Space, Fuzzy Baire Space, Fuzzy Perfectly Disconnected Space
| [1] | K. K. Azad, On fuzzy semi continuity, fuzzy almost continuity and fuzzy Weakly contiunity, J. Math. Anal. Appl, 52 (1981), 14–32. |
| [2] | G. Balasubramanian, Maximal fuzzy topologies, Kybernetika, 31 (5) (1995), 459–464. |
| [3] | A. S. Bin Shahna, On fuzzy strong semi continuity and fuzzy pre continuity, Fuzzy Sets and Systems, 44 (1991), 303–308. |
| [4] | C. L. Chang, Fuzzy Topological Spaces, J. Math. Anal., 24, (1968), 182–190. |
| [5] | B. Ghosh, Fuzzy Extremally Disconnected Spaces, Fuzzy sets and Sys. Vol. 46, No. 2 (1992), 245–250. |
| [6] | Miguel Caldas, Govindappa Navalagi, and Ratnesh Saraf, On fuzzy weakly semi-open functions, Proyecciones, Universidad Catolicadel Norte, Antofagasta – Chile, 21 (1), (2002), 51–63. |
| [7] | G. Thangaraj and G. Balasubramanian, On Fuzzy Basically Disconnected Spaces, J. Fuzzy Math., 9 (1) (2001), 103–110. |
| [8] | G. Thangaraj and G. Balasubramanian, On Somewhat Fuzzy Continuous Functions, J. Fuzzy Math, 11 (2) (2003), 725–736. |
| [9] | G. Thangaraj, Resolvability and irresolvability in fuzzy topological spaces, News Bull. Cal. Math. Soc., 31 (4-6) (2008), 11 − 14. |
| [10] | G. Thangaraj and G. Balasubramanian, On Fuzzy Resolvable and Fuzzy Irresolvable Spaces, Fuzzy Sets, Rough Sets and Multivalued Operations and Appl., Vol. 1, No. 2 (2009), 173–180. |
| [11] | G. Thangaraj and S. Anjalmose, Some remarks on Fuzzy Baire Spaces, Scientia Magna, Vol. 9, No 1. (2013), 1–6. |
| [12] | G. Thangaraj and E. Poongothai, On Fuzzy σ-Baire Spaces, Int. J.Fuzzy Math. Sys., 3 (4) (2013), 275–283. |
| [13] | G. Thangaraj and C. Anbazhagan, On Fuzzy Almost P-spaces, Inter. J. Innov. Sci., Engin. & Tech, Vol. 2, No. 4 (2015), 389–407. |
| [14] | G. Thangaraj and C. Anbazhagan, On fuzzy GID-Spaces, Ann. Fuzzy Math. Inform., 10 (4) (2015), 571–581. |
| [15] | G. Thangaraj and R. Palani, On fuzzy weakly Baire Spaces, Bull. Inter. Math. Virtual Institute, 7 (2017), 479–489. |
| [16] | G. Thangaraj and S. Senthil, Some Remark on Somewhere Fuzzy Continuous Functions (communicated to J. Adv. and Appl. Math. Sci.]. |
| [17] | G. Thangaraj and S. Muruganantham, Some Remarks on fuzzy Globally disconnected spaces, Bull. Inter. Math. VirtualInst. Vol. 9 (2019), 381–392. |
| [18] | G. Thangaraj and S. Muruganantham, A Note on Fuzzy Perfectly Disconnected Spaces, Adv. Fuzzy Math., Vol. 13, No. 1 (2018), 59–70. |
| [19] | G. Thangaraj and V. Seenivasan, On Fuzzy Strongly Irresolvable Spaces, Proc. Nat. Conf. on Fuzzy Math. Graph Theory (2008) (Jamal Mohamed College, Trichy, Tamilnadu, India). |
| [20] | Yalvac, T. H. Semi-interior and semi-closure of a fuzzy set, J. Math. Anal. Appl., 132 (1988), 356–364. |
| [21] | L. A. Zadeh, Fuzzy Sets, Inform. And Control, Vol. 8, (1965), 338-353. |
APA Style
Ganesan Thangaraj, Ayyavu Vinothkumar. (2022). On Fuzzy Semi-P-spaces and Related Concepts. Pure and Applied Mathematics Journal, 11(1), 20-27. https://doi.org/10.11648/j.pamj.20221101.12
ACS Style
Ganesan Thangaraj; Ayyavu Vinothkumar. On Fuzzy Semi-P-spaces and Related Concepts. Pure Appl. Math. J. 2022, 11(1), 20-27. doi: 10.11648/j.pamj.20221101.12
AMA Style
Ganesan Thangaraj, Ayyavu Vinothkumar. On Fuzzy Semi-P-spaces and Related Concepts. Pure Appl Math J. 2022;11(1):20-27. doi: 10.11648/j.pamj.20221101.12
Share This Article
Twitter
Linked In
Facebook
Copy
Download@article{10.11648/j.pamj.20221101.12,
author = {Ganesan Thangaraj and Ayyavu Vinothkumar},
title = {On Fuzzy Semi-P-spaces and Related Concepts},
journal = {Pure and Applied Mathematics Journal},
volume = {11},
number = {1},
pages = {20-27},
doi = {10.11648/j.pamj.20221101.12},
url = {https://doi.org/10.11648/j.pamj.20221101.12},
eprint = {https://article.sciencepublishinggroup.com/pdf/10.11648.j.pamj.20221101.12},
abstract = {In this paper the notion of fuzzy semi-P-spaces is introduced and studied. It is established that the class of fuzzy semi-P-spaces lies between the classes of fuzzy-P-spaces and fuzzy almost-P-spaces. It is established that fuzzy fuzzy σ-nowhere dense sets in fuzzy Semi-P-spaces are fuzzy Semi-closed sets and fuzzy Gδ-sets and fuzzy Fσ-sets are fuzzy σ-nowhere sets in fuzzy hyperconnected and semi-P-spaces are fuzzy dense sets. Also it is found that fuzzy residual sets in fuzzy globally disconnected and fuzzy Semi-P-spaces are fuzzy semi-open sets and fuzzy Gδ-sets in fuzzy perfectly disconnected and fuzzy Semi-P-spaces are fuzzy pre-open sets. Also it is established that fuzzy hyperconnected and semi-P-spaces are fuzzy irresolvable spaces. The conditions for fuzzy semi- P-spaces to become fuzzy σ-Baire spaces and fuzzy Baire spaces are obtained. The conditions for the fuzzy semi-P-spaces to become fuzzy strongly irresolvable spaces are also obtained in this paper.},
year = {2022}
}
TY - JOUR T1 - On Fuzzy Semi-P-spaces and Related Concepts AU - Ganesan Thangaraj AU - Ayyavu Vinothkumar Y1 - 2022/03/09 PY - 2022 N1 - https://doi.org/10.11648/j.pamj.20221101.12 DO - 10.11648/j.pamj.20221101.12 T2 - Pure and Applied Mathematics Journal JF - Pure and Applied Mathematics Journal JO - Pure and Applied Mathematics Journal SP - 20 EP - 27 PB - Science Publishing Group SN - 2326-9812 UR - https://doi.org/10.11648/j.pamj.20221101.12 AB - In this paper the notion of fuzzy semi-P-spaces is introduced and studied. It is established that the class of fuzzy semi-P-spaces lies between the classes of fuzzy-P-spaces and fuzzy almost-P-spaces. It is established that fuzzy fuzzy σ-nowhere dense sets in fuzzy Semi-P-spaces are fuzzy Semi-closed sets and fuzzy Gδ-sets and fuzzy Fσ-sets are fuzzy σ-nowhere sets in fuzzy hyperconnected and semi-P-spaces are fuzzy dense sets. Also it is found that fuzzy residual sets in fuzzy globally disconnected and fuzzy Semi-P-spaces are fuzzy semi-open sets and fuzzy Gδ-sets in fuzzy perfectly disconnected and fuzzy Semi-P-spaces are fuzzy pre-open sets. Also it is established that fuzzy hyperconnected and semi-P-spaces are fuzzy irresolvable spaces. The conditions for fuzzy semi- P-spaces to become fuzzy σ-Baire spaces and fuzzy Baire spaces are obtained. The conditions for the fuzzy semi-P-spaces to become fuzzy strongly irresolvable spaces are also obtained in this paper. VL - 11 IS - 1 ER -
Email: