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Cogent Mathematics Volume 2, 2015 - Issue 1
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Research Article

Some new higher separation axioms via sets having non-empty interior

Pratibha BhatSchool of Mathematics, Shri Mata Vaishno Devi University, Katra, 182320Jammu and Kashmir, IndiaView further author information
&
Ananga Kumar DasSchool of Mathematics, Shri Mata Vaishno Devi University, Katra, 182320Jammu and Kashmir, IndiaCorrespondence[email protected]
View further author information
|
Lishan LiuQufu Normal University, ChinaView further author information
(Reviewing Editor)
Article: 1092695 | Received 24 Aug 2015, Accepted 03 Sep 2015, Published online: 02 Oct 2015

References

  • Arhangelskii, A. V. (1996). Relative topological properties and relative topological spaces. Topology and its Applications, 70, 87–99.
  • Arhangel’skii, A. V., & Collins, P. J. (1995). On submaximal spaces. Topology and its Applications, 64, 219–241.
  • Bourbaki, N. (1961). Topologie Generale [General topology] (3rd ed., Actualites Scientifiques et Industrielles No. 1142).Paris: Hermann.
  • Cech, E. (1966). Topological spaces. Chichester: Wiley.
  • Das, A. K. (2009). -Normal spaces and decompositions of normality. Applied General Topology, 10, 197–206.
  • Das, A. K. (2013). A note on spaces between normal and -normal spaces. Filomat, 27, 85–88.
  • Galton, A. (2003). A generalized topological view of motion in discrete space. Theoretical Computer Science, 305, 111–134.
  • Kalantan, L. N. (2008). Normal topological spaces. Filomat, 22, 173–181.
  • Kohli, J. K., & Das, A. K. (2002). New normality axioms and decompositions of normality. Glasnik Matematicki, 37, 165–175.
  • Kuratowski, C. (1958). Topologie I. New York, NY: Hafner.
  • Levine, N. (1963). Semiopen sets and semicontinuity in topological spaces. American Mathematical Monthly, 70, 36–41.
  • Mashhour, A. S., Abd El-Monsef, M. E., & El-Deeb, S. N. (1982). On precontinuous and weak precontinuous mappings. Proceedings of the Mathematical and Physical Society of Egypt, 53, 47–53.
  • Liu, G. (2010). Closures and topological closures in quasi-discrete closure spaces. Applied Mathematics Letters, 23, 772–776.
  • Njastad, O. (1965). On some classes of nearly open sets. Pacific Journal of Mathematics, 15, 961–970.
  • Singal, M. K., & Arya, S. P. (1970). On almost normal and almost completely regular spaces. Glasnik Matematicki, 5, 141–152.
  • Singal, M. K., & Singal, A. R. (1973). Mildly normal spaces. Kyungpook Mathematical Journal, 13, 27–31.
  • Slapal, J. (2003). Closure operation for digital topology. Theoretical Computer Science, 305, 457–471.
  • Smyth, M. B. (1995). Semi-metrics, closure space and digital topology. Theoretical Computer Science, 151, 257–276.
  • Stchepin, E. V. (1972). Real valued functions and spaces close to normal. Siberian Mathematical Journal, 13, 1182–1196.

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