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Functions and weakly uH-compact spaces

Journal Name:

  • European Journal of Pure and Applied Mathematics

Publication Year:

  • 2017

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Abstract (Original Language): 
A GTS (X, /) is said to be weakly /H-compact if for every /-open cover {Va : a G A} of X there exists a finite subset A0 of A such that X \ U{cM(Va) : a G A0} G H. In this paper we study the effect of functions on weakly /H-compact spaces. The main result is that the 9(/, v)-continuous image of a weakly /H-compact space is weakly vf (H)-compact.
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REFERENCES

References: 

[1] A. Al-Omari and T. Noiri. A unified theory of contra-(/, v)-continuous functions in generalized topological spaces. Acta Math. Hungar, 135:31-41, 2012.
[2] C. Carpintero, E. Rosas, M. Salas-Brown, and J. Sanabria. /-compactness with respect to a hereditary class. Bol. Soc. Paran. Mat, 34(2):231-236, 2016.
[3] A. Csaszar. Generalized topology, generalized continuity. Acta Math. Hungar, 96:351¬357, 2002.
[4] Aâ . Csaâszaâr. Generalized open sets in generalized topologies. Acta Math. Hungar,
106(3):53-66, 2005.
[5] A. Csaszar. Modification of generalized topologies via hereditary classes. Acta Math. Hungar, 115:29-36, 2007.
[6] D. Jayanthi. Contra continuity on generalized topological spaces. Acta Math. Hungar,
137(4):263-271, 2012.
[7] T. Jyothis and J. Sunil. /-compactness in generalized topological spaces. J. Adv.
Stud. Top, 3(3):18-22, 2012.
REFERENCES 418
[8] Y. K. Kim and W. K. Min. On operations induced by hereditary classes on generalized topological spaces. Acta Math. Hungar, 137(1-2):130-138, 2012.
[9] K. Kuratowski. Topologies I. Warszawa, 1933.
[10] W. K. Min. ((, (^-continuity on generalized topological spaces. Acta Math. Hungar,
131297(4):350-356, 2010.
[11] W. K. Min. Generalized continuous functions defined by generalized open sets on generalized topological spaces. Acta Math. Hungar, 128:299-306, 2010.
[12] W. K. Min and Y. K. Kim. Some strong forms of (g, g)-continuity on generalized topological spaces. Honam Math. J, 33(1):85-91, 2011.
[13] W.K. Min. Almost continuity on generalized topological spaces. Acta Math. Hungar,
125:121-125, 2009.
[14] A. Qahis, H.H. Aljarrah, and T. Noiri. Weakly /-compact via a herediatary class. submitted.
[15] M. Rajamani and W. V. Ramesh. Some new generalized topologies via hereditary
classes. Bol. Soc. Paran. Mat, 30(2):71-77, 2012.
[16] M. S. Sarsak. On /-compact sets in /-spaces. Questions Answers General Topology,
31:49-57, 2013.
[17] M.S. Sarsak. Weakly /-compact spaces. Demonstratio Math, 45(2):929-938, 2012.
[18] A. M. Zahram, K. El-Saady, and A. Ghareeb. Modification of weak structures via
hereditary classes. Appl. Math. Letters, 25(2):869-872, 2012.

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