CFP last date
20 January 2025
Reseach Article

On Quasi Soft Semi #ga-Open and Quasi Soft Semi #ga-Closed Functions in Soft Topological Spaces

by V.kokilavani, M.vivek Prabu
International Journal of Computer Applications
Foundation of Computer Science (FCS), NY, USA
Volume 122 - Number 14
Year of Publication: 2015
Authors: V.kokilavani, M.vivek Prabu
10.5120/21768-5021

V.kokilavani, M.vivek Prabu . On Quasi Soft Semi #ga-Open and Quasi Soft Semi #ga-Closed Functions in Soft Topological Spaces. International Journal of Computer Applications. 122, 14 ( July 2015), 19-22. DOI=10.5120/21768-5021

@article{ 10.5120/21768-5021,
author = { V.kokilavani, M.vivek Prabu },
title = { On Quasi Soft Semi #ga-Open and Quasi Soft Semi #ga-Closed Functions in Soft Topological Spaces },
journal = { International Journal of Computer Applications },
issue_date = { July 2015 },
volume = { 122 },
number = { 14 },
month = { July },
year = { 2015 },
issn = { 0975-8887 },
pages = { 19-22 },
numpages = {9},
url = { https://ijcaonline.org/archives/volume122/number14/21768-5021/ },
doi = { 10.5120/21768-5021 },
publisher = {Foundation of Computer Science (FCS), NY, USA},
address = {New York, USA}
}
%0 Journal Article
%1 2024-02-06T23:10:32.461795+05:30
%A V.kokilavani
%A M.vivek Prabu
%T On Quasi Soft Semi #ga-Open and Quasi Soft Semi #ga-Closed Functions in Soft Topological Spaces
%J International Journal of Computer Applications
%@ 0975-8887
%V 122
%N 14
%P 19-22
%D 2015
%I Foundation of Computer Science (FCS), NY, USA
Abstract

In this Paper we define new functions namely quasi soft semi #g?-open functions and quasi soft semi #g?-closed functions in soft topological spaces via soft semi #g?-closed sets. We also investigate their basic properties.

References
  1. Bin Chen 2013 Soft Semi-Open Sets and Related Properties in Soft Topological Spaces. Applied Mathematics and Information Sciences, No. 1, (2013), 287-294.
  2. Gnanambal Ilango, Arun, B. , and Saravana Kumar, K. 2014. Some Properties of Soft ?-Open Sets in Soft Topological Space. IOSR Journal of Mathematics, Vol. 9, Issue 6 (Jan 2014), 20-24.
  3. Kannan, K. 2012. Soft Generalized-Closed Sets in Soft Topological Spaces. Journal of Theoretical and Applied Information Technology, Vol. 37, No. 1, (March 2012), 17-20.
  4. Kokilavani, V. , and Vivek Prabu, M. 2013. Semi #Generalized ?-Closed Sets and Semi #Generalized ?-Homeomorphism in Topological Spaces. Proceedings of National Conference on Recent Advances in Mathematical Analysis and Applications (NCRAMAA-2013), 153-161.
  5. Kokilavani, V. , and Vivek Prabu, M. 2015. Soft Semi #Generalized ?-Closed Sets in Soft Topological Spaces. International Journal of Pure and Applied Mathematics (Accepted).
  6. Kokilavani, V. , and Vivek Prabu, M. 2015. On Soft Semi #Generalized ?-Normal Spaces (Submitted) .
  7. Kokilavani, V. , and Vivek Prabu, M. 2015. On Quasi Semi #Generalized ?-Open and Quasi Semi #Generalized ?-Closed Sets Closed Sets in Topological Spaces. Proceedings of ICAMEST (2015).
  8. Kokilavani, V. , Sindu, D. , and Vivek Prabu, M. 2014. Soft #Generalized ?-Closed Sets in Soft Topological Spaces. International Journal of Advanced and Innovative Research (2278-7844), Vol. 3, Issue 10, (2014), 265-271.
  9. Karuppayal, V. R. , and Malarvizhi, M. 2014. Soft Generalized# ?-Closed Sets in Soft Topological Spaces. International Journal of Advanced and Innovative Research (2278-7844), Vol. 3, Issue 10, (2014), 298-305.
Index Terms

Computer Science
Information Sciences

Keywords

semi #g?-closed set quasi semi #g?-open function quasi semi #g?-closed function soft semi #g?-closed set quasi soft semi #g?-open function quasi soft semi #g?-closed function semi #g?-closure semi #g?-interior semi #g?-irresolute soft semi #g?-closure soft semi #g?-interior soft semi #g?-continuous soft semi #g?-irresolute.