CnIg-Continuous Maps in Nano Ideal Topological Spaces

  • Ganesan Selvaraj Raja Doraisingam Government Arts College
Keywords: Nano Ideal Topological Space, nIg-Interior, nIg-Closure, nIg-Continuous Map and nIg-Irresolute Map

Abstract

The aim of in this paper, we introduced nIg-interior, nIg-closure and study some of its basic properties. we introduced and studied nIg-continuous map, nIg-irresolute map and study their properties in nano ideal topological spaces

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Author Biography

Ganesan Selvaraj, Raja Doraisingam Government Arts College

Assistant Professor, PG & Research Department of Mathematics, Raja Doraisingam Government Arts College, Sivagangai-630561, Tamil Nadu, India

References

[1] R. Asokan, O. Nethaji and I. Rajasekaran, On nano generalized ⋆-closed sets in an ideal nano
topological space, Asia Mathematika, 2(3), (2018), 50-58.
[2] S. Ganesan, nIg-closed sets in nano ideal topological spaces (Asia Mathematika to appear).
[3] J.Jayasudha and T. Rekhapriyadharsini, On some decompositions of nano ⋆-continuity, international
Journal of Mathematics and Statistics Invention, 7(1), (2019), 01-06.
[4] M.LellisThivagar and Carmel Richard, On Nano forms of weakly open sets, international Journal
of Mathematics and Statistics Invention, 1(1)(2013), 31-37.
[5] M. Parimala, T.Noiri and S. Jafari, New types of nano topological spaces via nano ideals
(communucated).
[6] M. Parimala, S. Jafari and S. Murali, Nano ideal generalized closed sets in nano ideal topological
spaces, Annales Univ.Sci. Budapest, 60(2017), 3-11.
[7] M. Parimala and S. Jafari, On some new notions in nano ideal topological spaces, Eurasian
Bulletin of Mathematics, 1(3)(2018), 85-93.
Published
2019-12-21
How to Cite
Selvaraj, G. (2019). CnIg-Continuous Maps in Nano Ideal Topological Spaces. MathLAB Journal, 4, 182-190. Retrieved from https://purkh.com/index.php/mathlab/article/view/614
Section
Research Articles