ON bi- INTUITIONSTIC TOPOLOGICAL SPACE
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Abstract
In this paper we introduce a new definition is called bi- intuitionistic topological space and from this concept we present some kinds of closed set (semi –closed, pre-closed ,β-closed ,α-closed) setes in bi- intuitionistic topological space, define generalized closed set (sg-closed ,gs-closed ,gp-closed, gα-closed , αg- closed , gβ-closed) sets in bi - intuitionistic topological space and give relationship among them , we introduce the definition of Tgs-space in bi- intuitionistic topological space and from this consept we get new results
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References
[1].Al-hawez, Z. T. (2008), generalized slightly continuous function between ITS, M.Sc. thesis college of Education Tikrit university.
[2].Andrijeric, D. (1996) “On b-open sets” M. Bechnk. 48 pp. 59-64.
[3].J. C. Kelly, Bitopological spaces, Proc, London Math. Soc., 13 (1963), 71–89.
[4]. Coker, D. (1996) “ a note on intuitionistic set and intuitionistic points” Turkish J. of Math. Vol.20, pp.
343-351.
[5].Ozcelik, A. Z. and Narli, S. (2007) “ On submaximality in intuitionistic topological space” International J. of Math. And Math. Sci. Vol. 1. No.1. pp. 139-141
[6].Özcač , S. and Coker, D. (2000) “ A note on connectedness in intuitionistic fuzzy special topological spaces” International J. of Math. and Math. Sci. Vol. 23. No.1. pp. 45-54.
[7].Jeon, J. K., Baejun Y. and Park, J. H. (2005) “ Intuitionistic fuzzy alpha-continuity and intuitionistic fuzzy precontinuity” Inter. J. of Math. Sci. 3041-3101.
[8]..Noiri, T. and Popa, V. (2006) “Slightly m-continuous multifunction” Bull. Of the institute of mathematic Academia Sinica Vol. 1, No. 4, pp. 484-505.