On Weak forms of Continuous and Irresolute functions in Fuzzy Bitopological Spaces

AUTHOR AND
AFFILIATION

T. THANGAM1 and K. BAGEERATHI2
1Department of Mathematics, Govindammal Aditanar College for Women, Tiruchendur-628215, Tamilnadu (India)
2Department of Mathematics, Aditanar College of Arts and Science, Tiruchendur-628216, Tamilnadu (India)

KEYWORDS:

Fuzzy complement function ℭ , fuzzy ℭ -(i, j) –semi closure, fuzzy ℭ -(i, j) –semi interior subsets, pairwise fuzzy ℭ - semi continuous, pairwise fuzzy ℭ - totally continuous, pairwise fuzzy ℭ - totally semi continuous, pairwise fuzzy ℭ - irresolute pairwise contra fuzzy ℭ - irresolute mappings and fuzzy bitopological spaces

Issue Date:

December 2015

Pages:

ISSN:

2319-8044 (Online) – 2231-346X (Print)

Source:

Vol.27 – No.3

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DOI:

jusps-A

ABSTRACT:

Focus of this paper is to introduce the concept of pairwise fuzzy ℭ – semi continuous, pairwise fuzzy ℭ – totally continuous, pairwise fuzzy ℭ – totally semi continuous and pairwise fuzzy ℭ – irresolute mappings of a fuzzy bitopological space where ℭ : [0,1]  [0,1] is a complement function. Several examples are given to illustrate the concepts introduced in this paper.

Copy the following to cite this Article:

T. THANGAM1 and K. BAGEERATHI2, “On Weak forms of Continuous and Irresolute functions in Fuzzy Bitopological Spaces”, Journal of Ultra Scientist of Physical Sciences, Volume 27, Issue 3, Page Number , 2016


Copy the following to cite this URL:

T. THANGAM1 and K. BAGEERATHI2, “On Weak forms of Continuous and Irresolute functions in Fuzzy Bitopological Spaces”, Journal of Ultra Scientist of Physical Sciences, Volume 27, Issue 3, Page Number , 2016

Available from: http://www.ultrascientist.org/paper/369/


Focus of this paper is to introduce the concept of pairwise fuzzy ℭ – semi continuous, pairwise fuzzy ℭ – totally continuous, pairwise fuzzy ℭ – totally semi continuous and pairwise fuzzy ℭ – irresolute mappings of a fuzzy bitopological space where ℭ : [0,1]  [0,1] is a complement function. Several examples are given to illustrate the concepts introduced in this paper.