Fuzzy gb- Continuous Maps in Fuzzy Topological Spaces

S. S. Benchalli; Jenifer J.Karnel

Research Article

Fuzzy gb- Continuous Maps in Fuzzy Topological Spaces

by S. S. Benchalli, Jenifer J.Karnel

International Journal of Computer Applications

Foundation of Computer Science (FCS), NY, USA

Volume 19 - Issue 1

Published: April 2011

Authors: S. S. Benchalli, Jenifer J.Karnel

10.5120/2325-3019

PDF

S. S. Benchalli, Jenifer J.Karnel . Fuzzy gb- Continuous Maps in Fuzzy Topological Spaces. International Journal of Computer Applications. 19, 1 (April 2011), 24-29. DOI=10.5120/2325-3019

                        @article{ 10.5120/2325-3019,
                        author  = { S. S. Benchalli,Jenifer J.Karnel },
                        title   = { Fuzzy gb- Continuous Maps in Fuzzy Topological Spaces },
                        journal = { International Journal of Computer Applications },
                        year    = { 2011 },
                        volume  = { 19 },
                        number  = { 1 },
                        pages   = { 24-29 },
                        doi     = { 10.5120/2325-3019 },
                        publisher = { Foundation of Computer Science (FCS), NY, USA }
                        }

                        %0 Journal Article
                        %D 2011
                        %A S. S. Benchalli
                        %A Jenifer J.Karnel
                        %T Fuzzy gb- Continuous Maps in Fuzzy Topological Spaces%T 
                        %J International Journal of Computer Applications
                        %V 19
                        %N 1
                        %P 24-29
                        %R 10.5120/2325-3019
                        %I Foundation of Computer Science (FCS), NY, USA

Abstract

The purpose of this paper is to introduce a new form of generalized mapping namely fgb-continuous, fgb-irresolute mappings, fgb-closed maps, fgb-open and fgb*-open maps in fuzzy topological spaces. Some of their properties and characterization have been proved. As an application of these generalized fuzzy sets, fuzzy gbT1/2-space , fgb-homeomorphism and fgb*-homeomorphism are introduced and discussed in detail.

References

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G. Balasubramanian and P.Sundaram, On some generalizations of fuzzy continuous, Fuzzy Sets and Systems, 86 (1997), 93-100.
S.S.Benchalli and Jenifer Karnel, On Fuzzy b-open sets in Fuzzy Topological Space J.Computer and Mathematical Sciences 1(2010),127-134.
S.S.Benchalli and Jenifer Karnel, On Fuzzy b-neighbourhoods and Fuzzy b-mappings in Fuzzy Topological Space, J.Computer and Mathematical Sciences 1(6),(2010),696-701.
S.S.Benchalli and Jenifer Karnel, Weaker and stronger forms of fuzzy b-irresolute maps, Int. J. Math., Anal.,(communicated).
S.S.Benchalli and Jenifer Karnel, On fbg-closed sets and fb-seperation Axioms in Fuzzy Topological Spaces, (communicated).
C.L.Chang, Fuzzy topological spaces, J. Math. Anal. Appl. (1968), 182-190.
Pao-Ming Pu and Ying- Ming Liu, Fuzzy Topology- I.Neighborhood structure of fuzzy point and Moore-smith convergence, J. Math.Anal.Appl. 6 (1980) 571-599.
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Index Terms

Computer Science

Information Sciences

No index terms available.

Keywords

Fgb-closed sets fgb-neighbourhood fgbq-neighbourhood fgb-continuous fgb-irresolute mappings fgb-closed maps fgb*-open maps fuzzy gbT1/2-space fgb-homeomorphism fgb*-homeomorphism