On nano semi $\widehat{g}$-closed sets in nano topological spaces
Downloads
DOI:
https://doi.org/10.26637/MJM0701/0012Abstract
This paper focuses on $\mathscr{N} s \widehat{g}$-closed sets (nano semi $\widehat{g}$-closed sets) and $\mathscr{N} s \widehat{g}$-open sets (nano semi $\widehat{g}$-open sets) in nano topological spaces and certain properties are investigated. We also investigate and discussed their relationships with other forms of nano sets. Further, we have given an appropriate examples to understand the abstract concepts clearly.
Keywords:
Ng-closed sets,, \mathcal{N} s \widehat{g} \text {-closed sets }, \mathcal{N} s \widehat{g} \text {-open sets }Mathematics Subject Classification:
Mathematics- Pages: 62-66
- Date Published: 01-01-2019
- Vol. 7 No. 01 (2019): Malaya Journal of Matematik (MJM)
Balachandran. K, Sundaram. P, and Maki. H, On generalized continuous maps in topological spaces, Mem. Fac.sci. Kochi. Univ.Ser.A. Maths., 12(1991), 5-13.
Bhuvaneshwari. $mathrm{K}$ and Mythili Gnanapriya. K, Nano generalized closed sets, International Journal of Scientific and Research Publications, 14(5)(2014), 1-3.
Bhuvaneshwari. K and Ezhilarasi. K, Nano semi generalized and Nano generalized semi closed sets, International Journal of Mathematics and Computer Application Research, 4(3)(2014), 117-124.
Bhuvaneshwari. K and Mythili Gnanapriya. K, Nano generalized pre closed sets and Nano pre generalized closed sets in nano topological spaces, International Journal of Innovative Research in Science, Engineering and Technology, 3(10)(2014), 16825-16829.
Chandrasekar. S, Rajesh kannan. T, Suresh. M, Contranano sg-continuity in nano topological spaces, International Journal on Research Innovations in Engineering Science and Technology, 2(4)(2017), 102-109.
Jafari. S, Noiri. T, Rajesh. N and Thivagar. M.L, Another generalization of closed sets, Kochi J. Math., 3(2008), 25-38.
Lalitha. R and Francina Shalini A, $mathscr{N} widetilde{g}$-closed and open sets in nano topological spaces, International Journal of Applied Research, 3(5), (2017), 368-371.
Lellis Thivagar. M and Carmel Richard, On nano forms of weakly open sets, International Journal of Mathematics and Statistics Invention, 1(1)(2013), 31-37.
Bhuvaneswari. K, Thanga Nachiyar. R, On nano generalized A-closed sets and Nano A generalized closed sets in Nano Topological spaces, International Journal of Engineering Trends and Technology, 13(6)(2014), 12-23.
Levine. N, Generalized closed sets in topology, Rend. Circ. Mat. Palermo, (2) 19 (1970), 89-96.
Rajasekaran. I, Meharin. M and Nethaji. O, On nano $g beta$ closed sets, International Journal of Mathematics and its Applications, 5(4-c), (2017), 377-382.
Bhuvaneshwari. K, Mythili Gnanapriya, Nano locally closed sets and NGLC- continuous Functions in Nano Topological Spaces, International Journal of Mathematics and its Applications, 4(1-A)(2016), 101-106.
Thivagar.M.L, Richard.C, On nano forms of weakly open sets, International Journal of Mathematics and Statistics Invention, 1(1)(2013), 31-37.
- NA
Similar Articles
- A. Atkinswestley, S. Chandrasekar, Neutrosophic \(\mathrm{g}^{\#} \mathrm{~S}\) closed sets in neutrosophic topological spaces , Malaya Journal of Matematik: Vol. 8 No. 04 (2020): Malaya Journal of Matematik (MJM)
- A. Pushpalatha, T. Nandhini , Generalized closed sets via neutrosophic topological spaces , Malaya Journal of Matematik: Vol. 7 No. 01 (2019): Malaya Journal of Matematik (MJM)
- G. Upender Reddy, T. Siva Nageswara Rao, N. Srinivasa Rao, V. Venkateswara Rao, Bipolar topological pre-closed neutrosophic sets , Malaya Journal of Matematik: Vol. 9 No. 01 (2021): Malaya Journal of Matematik (MJM)
You may also start an advanced similarity search for this article.
Metrics
Published
How to Cite
Issue
Section
License
Copyright (c) 2019 MJM
This work is licensed under a Creative Commons Attribution 4.0 International License.
