On (mx;my )-approximately semi open maps between mx-spaces1 Report as inadecuate




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In this article, the notion of mX;mY -approximately semi open maps between m-spaces is given as a generalization of the concept of approximately semi open maps. Also some characterizations of mX;mY -approximately semi open maps are given.

Tipo de documento: Artículo - Article

Palabras clave: m-structure, mX-semi closed set, mX-sg closed set.





Source: http://www.bdigital.unal.edu.co


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Bol.
Mat.
17(1), 37–58 (2010) 37 On (mX , mY )–approximately semi open maps between mX –spaces1 Ennis Rosas2 Carlos Carpintero3 Departamento de Matemáticas, Facultad de Ciencias Universidad UDO, Cumaná, Venezuela Oya Ȯzbakir4 Department of Mathematics Ege University, Izmir, Turkey Neelamegarajan Rajesh5 Department of Mathematics Rajah Serfoj Govt.
College, Tamilnadu, India En este artı́culo se da la noción de mapeos semi abiertos aproximadamente (mX , mY ) entre m–espacios como una generalización del concepto de mapeos aproximadamente semi abiertos.
También se dan algunas caracterizaciones de los mapeos aproximadamente semi abiertos (mX , mY ). Palabras Claves: m–estructuras, conjuntos semi cerrados mX , conjuntos cerrados mX –sg. In this article, the notion of (mX , mY )–approximately semi open maps between m–spaces is given as a generalization of the concept of approximately semi open maps.
Also some characterizations of (mX , mY )– approximately semi open maps are given. Keywords: m–structure, mX –semi closed set, mX –sg closed set. MSC: 54A05, 54A20, 54C08, 54D10. 1 Research Partially Supported by Consejo de Investigación UDO. ennisrafael@gmail.com 3 carpintero.carlos@gmail.com 4 oya.ozbakir@ege.edu.tr 5 nrajesh-topology@yahoo.co.in 2 38 1 Rosas et al., On (mX , mY )–approximately Introduction The concept of minimal structure was introduced in 1999 by Maki et al.
[11].
After this work, various mathematicians turned their attention in introducing and studying diverse classes of sets defined on the m– structure, because this notion is a natural generalization of many well known results related to generalized sets in topological spaces and several weaker forms of continuity.
Each one of these classes of sets is, in turn, used in order to obtain different separation properties and new forms of continuity (see [1, 5, 6, 7, 8, 9, 12, 14, 15], for details).
In this work, we use the notion of m–structure in order ...






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