On Upper and Lower Faintly ψαg-Continuous Multifunctions

V. Kokilavani; P. R. Kavitha

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Reseach Article

On Upper and Lower Faintly ψαg-Continuous Multifunctions

by V. Kokilavani, P. R. Kavitha

International Journal of Computer Applications

Foundation of Computer Science (FCS), NY, USA

Volume 179 - Number 21

Year of Publication: 2018

Authors: V. Kokilavani, P. R. Kavitha

10.5120/ijca2018916389

V. Kokilavani, P. R. Kavitha . On Upper and Lower Faintly ψαg-Continuous Multifunctions. International Journal of Computer Applications. 179, 21 ( Feb 2018), 23-25. DOI=10.5120/ijca2018916389

@article{ 10.5120/ijca2018916389,

author = { V. Kokilavani, P. R. Kavitha },

title = { On Upper and Lower Faintly ψαg-Continuous Multifunctions },

journal = { International Journal of Computer Applications },

issue_date = { Feb 2018 },

volume = { 179 },

number = { 21 },

month = { Feb },

year = { 2018 },

issn = { 0975-8887 },

pages = { 23-25 },

numpages = {9},

url = { https://ijcaonline.org/archives/volume179/number21/28993-2018916389/ },

doi = { 10.5120/ijca2018916389 },

publisher = {Foundation of Computer Science (FCS), NY, USA},

address = {New York, USA}

}

%0 Journal Article

%1 2024-02-07T00:59:10.943598+05:30

%A V. Kokilavani

%A P. R. Kavitha

%T On Upper and Lower Faintly ψαg-Continuous Multifunctions

%J International Journal of Computer Applications

%@ 0975-8887

%V 179

%N 21

%P 23-25

%D 2018

%I Foundation of Computer Science (FCS), NY, USA

Abstract

The aim of this paper is to introduce and study upper and lower faintly ψαg-Continuous Multifunctions as a generalization of upper and lower ψαg-continuous multifunctions, respectively. The basic properties and characterizations of such functions are established.

References

Long P.E., and Herrington L.L.1982. The τ_θ topology and faintly continuous functions, Kyungpook Math. J., 22(1982), 7-14.
Noiri T., and Popa V.1993. Almost weakly continuous multifunctions, Demon-stratio Math., 26(2)(1993), 363-380.
Sinharoy S., and Bandyopadhyay S. On θ-completely regular and locally θ-H-closed spaces, Bull. Cal. Math. Soc., 87(1995), 19-26.
Velicko N.V. 1968. H-closed topological spaces, Amer. Math. Soc. Transl., 78 (1968), 103-118.
Kokilavani V., and KavithaP.R. 2016. On ψαg-closed sets in topological spaces, IJMA-7(1), 2016, 1-7

Index Terms

Computer Science

Information Sciences

Keywords

ψαg-open sets ψαg-closed sets faintly ψαg-continuous multifunctions ψαg-θ-closed.