The aim of this paper is to study the class of β-normal spaces. The relationships among s-normal spaces, pnormal
spaces and β-normal spaces are investigated. Moreover, we study the forms of generalized β-closed
functions. We obtain characterizations of β-normal spaces, properties of the forms of generalized β-closed
functions and preservation theorems.
%0 Journal Article
%1 noauthororeditor
%A o. Ravi, 2
%A i. Rajasekaran, 3
%A s. Murugesan,
%A 4,
%A a. Pandi,
%D 2015
%E Mathematics, Applied
%E ), Sciences: An International Journal (MathSJ
%J ON β-NORMAL SPACES
%K tag
%N 1
%P 27-40
%T ON β-NORMAL SPACES
%U http://airccse.com/mathsj/papers/2115mathsj03.pdf
%V 2
%X The aim of this paper is to study the class of β-normal spaces. The relationships among s-normal spaces, pnormal
spaces and β-normal spaces are investigated. Moreover, we study the forms of generalized β-closed
functions. We obtain characterizations of β-normal spaces, properties of the forms of generalized β-closed
functions and preservation theorems.
@article{noauthororeditor,
abstract = {The aim of this paper is to study the class of β-normal spaces. The relationships among s-normal spaces, pnormal
spaces and β-normal spaces are investigated. Moreover, we study the forms of generalized β-closed
functions. We obtain characterizations of β-normal spaces, properties of the forms of generalized β-closed
functions and preservation theorems. },
added-at = {2018-02-15T08:24:11.000+0100},
author = {o. Ravi, 2 and i. Rajasekaran, 3 and s. Murugesan and 4 and a. Pandi},
biburl = {https://www.bibsonomy.org/bibtex/2626ce5d2b9fc9b914b28cba8ef41b884/mathsj},
editor = {Mathematics, Applied and ), Sciences: An International Journal (MathSJ},
interhash = {1ab543c09f8f77d74ebe3ba1fd0c9d01},
intrahash = {626ce5d2b9fc9b914b28cba8ef41b884},
issn = {2349-6223},
journal = {ON β-NORMAL SPACES},
keywords = {tag},
language = {english},
month = {march},
number = 1,
pages = {27-40},
timestamp = {2018-02-15T08:24:11.000+0100},
title = {ON β-NORMAL SPACES},
url = {http://airccse.com/mathsj/papers/2115mathsj03.pdf},
volume = 2,
year = 2015
}