Epinormality
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Authors
Samirah AlZahrani
- Department of Mathematics, Taif University, P. O. Box 888, Taif 21974, Saudi Arabia.
Lutfi Kalantan
- Department of Mathematics, King Abdulaziz University, P. O. Box 80203, Jeddah 21589, Saudi Arabia.
Abstract
A topological space \((X ; {\tau} )\) is called epinormal if there is a coarser topology \(\acute{\tau}\) on \(X\) such that \((X ;
\acute{\tau} )\) is \(T_4\). We investigate this property and present some examples to illustrate the relationships between
epinormality and other weaker kinds of normality.
Share and Cite
ISRP Style
Samirah AlZahrani, Lutfi Kalantan, Epinormality, Journal of Nonlinear Sciences and Applications, 9 (2016), no. 9, 5398--5402
AMA Style
AlZahrani Samirah, Kalantan Lutfi, Epinormality. J. Nonlinear Sci. Appl. (2016); 9(9):5398--5402
Chicago/Turabian Style
AlZahrani, Samirah, Kalantan, Lutfi. "Epinormality." Journal of Nonlinear Sciences and Applications, 9, no. 9 (2016): 5398--5402
Keywords
- Normal
- epinormal
- mildly normal
- C-normal
- L-normal
- submetrizable
- regularly closed.
MSC
References
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