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Nano Generalized E-Continuous Mappings in Nano Topological Spaces
P. Manivannan1, A. Vadivel2, M. Seenivasan3, V. Chandrasekar4
1P. Manivannan, Department of Mathematics, Kandaswamy Kandar’s College, P-velur, Tamil Nadu-638 182, India; Department of Mathematics, Government College of Engineering-Srirangam, Tiruchirappalli, Tamil Nadu, India.
2Vadivel, PG & Research Department of Mathematics, Government Arts College (Autonomous),Karur-639005;Department of Mathematics, Annamalai University, Annamalainagar, India.
3M. Seenivasan, Department of Mathematics, Annamalai University, Annamalai Nagar, India.
4V. Chandrasekar, Department of Mathematics, Kandaswamy Kandar’s College, P-velur, Tamil Nadu, India.

Manuscript received on January 02, 2020. | Revised Manuscript received on January 15, 2020. | Manuscript published on January 30, 2020. | PP: 2172-2176 | Volume-8 Issue-5, January 2020. | Retrieval Number: E6088018520/2020©BEIESP | DOI: 10.35940/ijrte.E6088.018520

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© The Authors. Blue Eyes Intelligence Engineering and Sciences Publication (BEIESP). This is an open access article under the CC BY-NC-ND license (http://creativecommons.org/licenses/by-nc-nd/4.0/)

Abstract: In this paper, we discuss ng-continuous and irresoluteness via ng in nts’s. Also some characterizations are discussed with necessary examples.
Keywords: Nano Generalized -, Nano Generalized -. Ams (2000) Subject Classification: 54b05.
Scope of the Article: Nanometer-Scale Integrated Circuits.