Generalization of ∆-Closed Sets in Ideal Spaces

Article Sidebar

PDF
DOI: https://doi.org/10.28924/2291-8639-23-2025-107
Published: May 8, 2025
Cite as:
Yasser Farhat, Rock Ramesh, Alphymol Varghese, Generalization of ∆-Closed Sets in Ideal Spaces, Int. J. Anal. Appl., 23 (2025), 107.

Main Article Content

Yasser Farhat, Rock Ramesh, Alphymol Varghese

Abstract

In the paper, we introduce gD-closed sets and gD-closed sets using ideal spaces, and some of the properties and characterizations are discussed. Further, the relationships among some of the existing generalizations are investigated with the closed sets. Every Ig-closed set is gD-closed is proved in general and some results are investigated.

Article Details

References

  1. N. Levine, Generalized Closed Sets in Topology, Rend. Circ. Mat. Palermo 19 (1970), 89–96. https://doi.org/10.1007/BF02843888.
  2. J. Dontchev, M. Ganster, T. Noiri, Unified Operation Approach of Generalized Closed Sets via Topological Ideals, Math. Japon. 49 (1999), 395–402.
  3. R. Vaidyanathaswamy, Set Topology, Courier Corporation, 1960.
  4. M. Navaneethakrishnan, J. Paulraj Joseph, g-Closed Sets in Ideal Topological Spaces, Acta Math. Hung. 119 (2008), 365–371. https://doi.org/10.1007/s10474-007-7050-1.
  5. M.V. Kumar, On δ-Open Sets in Topology, Preprint, 2025.
  6. Y. Farhat, R. Ramesh, A. Varghese, V. Subramanian, D∗ -Local Functions in Ideal Spaces, Int. J. Anal. Appl. 22 (2024), 102. https://doi.org/10.28924/2291-8639-22-2024-102.
  7. D. Jankovic, T.R. Hamlet, New Topologies from Old via Ideals, Amer. Math. Mon. 97 (1990), 295–310. https://doi.org/10.2307/2324512.
  8. E. Hayashi, Topologies Defined by Local Properties, Math. Ann. 156 (1964), 205–215. https://doi.org/10.1007/BF01363287.
  9. N. Velicko, H-Closed Topological Spaces, Mat. Sb. 70 (1966), 98–112.
  10. J. Dontchev, H. Maki, On θ-generalized Closed Sets, Int. J. Math. Math. Sci. 22 (1999), 239–249. https://doi.org/10.1155/S0161171299222399.
  11. S. Maragathavalli, D. Vinodhini, On α Generalized Closed Sets In Ideal Topological Spaces, IOSR J. Math. 10 (2014), 33–38. https://doi.org/10.9790/5728-10223338.
  12. J. A. R. Rodrigo, O. Ravi, A. Naliniramalatha, g-closed sets in ideal topological spaces, Methods of functional ˆ Analysis and Topology 17 (3), 274–280, 2011 .
  13. N. Levine, Semi-open sets and semi-continuity in topological spaces, The American mathematical monthly 70 (1), 36–41, 1963. https://doi.org/10.1080/00029890.1963.11990039.
  14. A. Açikgöz, ¸S. Yuksel, Some New Sets and Decompositions of A I-R-Continuity, α-I-Continuity, Continuity via Idealization, Acta Math. Hung. 114 (2007), 79–89. https://doi.org/10.1007/s10474-006-0514-x.
  15. E. Ekici, S. Özen, A Generalized Class of τ ∗ in Ideal Spaces, Filomat 27 (2013), 529–535. https://www.jstor.org/stable/24896381.
  16. R. Ramesh, Periyasamy, g∆ ? and gs∆ ?-Closed Sets in Ideal Spaces, Eur. Chem. Bull. 12 (2023), 2916–2925.
  17. D. Jankov, On Some Separation Axioms and θ-Closure, Mat. Vesnik 4 (1980), 439–450.
  18. Y. Farhat, M. Krishnan, V. Subramanian, M. R. Ahmadi Zand, Submaximality on Bigeneralized Topological Spaces, Eur. J. Pure Appl. Math. 16 (2023), 386–403. https://doi.org/10.29020/nybg.ejpam.v16i1.4655.