Published December 28, 2011
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(T1, T2)*- Semi Star Generalized Locally Closed Sets
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The aim of this paper is to continue the study of (T1, T2)-semi star generalized closed sets by introducing the concepts of (T1, T2)-semi star generalized locally closed sets and study their basic properties in bitopological spaces.
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References
- P. Bhattacharya and B.K. Lahiri, Semi-generalized closed sets in topology, Indian J. Math., 29 (3)(1987), 375-382.
- M.C. Cueva, On g-closed sets and g-continuous mappings, Kyungpook Math. J., 33 (2) (1993), 205-209.
- K. Chandrasekhara Rao and K. Joseph, Semi star generalized closed sets, Bulletin of Pure and Applied Sciences, 19E(No 2) 2000, 281-290
- K. Chandrasekhara Rao and K. Kannan, Semi star generalized closed sets and semi star generalized open sets in bitopological spaces, Var¯ahmihir Journal of Mathematical Sciences, Vol.5, No 2(2005) 473-485.
- K. Chandrasekhara Rao, K. Kannan and D. Narasimhan, Characterizations of 12-sg closed sets, Acta Ciencia Indica, Vol. XXXIII, No. 3, (2007) 807-810.
- K. Chandrasekhara Rao and K. Kannan, sg-locally closed sets in topological spaces,Bulletin of Pure and Applied Sciences, Vol. 26E (No.1), 2007, 59-64.
- K.Chandrasekhara Rao and K. Kannan, Some properties of sg-locally closed sets, Journal of Advanced Research in Pure Mathematics, 1 (1) (2009), 1-9.
- K.Chandrasekhara Rao and K. Kannan, sg-locally closed sets in bitopological spaces,Int. J. Contemp. Math. Sciences, Vol. 4, no. 12 (2009), 597-607.
- K. Chandrasekhara Rao and N. Planiappan, Regular generalized closed sets, Kyungpook Math. J., 33 (2) (1993), 211-219. [10] J. Dontchev, On submaximal spaces, Tamkang J. Math., 26(3) (1995), 243-250. [11] T. Fukutake, Semi open sets on bitopological spaces, Bull. Fukuoka Uni. Education, 38(3)(1989), 1-7. [12] T. Fukutake, On generalized closed sets in bitopological spaces, Bull. Fukuoka Univ. Ed. Part III, 35 (1986), 19-28. [13] M. Ganster , Arockiarani and K. Balachandran, Regular generalized locally closed sets and RGLC-contiunuous functions, Indian J. Pure and Appl. Math., 27 (3)(1996), 235-244. [14] M. Ganster and I.L. Reilly, Locally closed sets and LC contiunuous functions, International J. Math. and Math. Sci., 12 (1989), 417-424. [15] M. Ganster, I.L. Reilly and J. Cao, On sg-closed sets and g-closed sets, Preprint [16] M. Ganster, I.L. Reilly and J. Cao, Summaximality, extremal disconnectedness and generalized closed sets, Houston Journal of Mathematics, 24 (4) (1998), -. [17] M. Ganster, I.L. Reilly and M.K. Vamanamurthy, Remarks on locally closed sets, Math. Panon., 3 (2) (1992), 107-113. [18] Y. Gnananmbal and K. Balachandran, -locally closed sets and -LC continuous functions, Mem. Fac. Sci. Kochi Univ. Ser. A, Math., 19 (1998), 35-44. [19] M. Jelic, On pairwise lc-continuous mappings, Indian J. Pure Appl. Math., 22 (1) (1991), 55-59. [20] K. Kannan, D. Narasimhan, K. Chandrasekhara Rao and M. Sundararaman, (1, 2)-Semi Star Generalized Closed Sets in Bitopological Spaces, Journal of Advanced research in Pure Mathematics, Vol. 2, No. 3 (2010), 34-47. [21] J. C. Kelly, Bitopological spaces, Proc. London Math. Society, 13(1963),71-89. [22] T.Y. Kong, R. Kopperman and P.R. Meyer, A topological approach to digital topology, Amer. Math. Monthly, 98 (1991), 901-917. [23] M. Lellis Thivagar and O. Ravi, A Bitopological (1, 2)-semi generalised continuous maps, Bull. Malays. Math. Sci. Soc., 2006, (2) 29(1): 79-88. [24] N. Levine, Semi-open sets and semi-continuity in topological spaces, Amer. Math. Monthly, 70 (1963), 36-41. [25] N.Levine, Generalized closed sets in topology, Rend. Circ. Mat. Palermo, 19 (2) (1970), 89-96. [26] H. Maki, P. Sundaram and K. Balachandran, Generalized locally closed sets and glc-continuous functions, Indian J. Pure Appl. Math., 27(3) (1996), 235-244. [27] N. Palaniappan and R. Alagar, Regular generalized locally closed sets with respect to an ideal, Antarctica J. Math, 3 (1) (2006), 1-6. [28] Shantha Bose, Semi open sets, semi continuity and semi open mappings in bitopological spaces, Bull. Cal. Math. Soc., 73 (1981), 237-246. [29] M.K.R.S. Veera Kumar, gÔÖ»-locally closed sets and GÔÖ»LC-functions, Antartica J. Math., 1(1) 2004, 35-46