[[1] J. Dontchev, M. Ganster, and T. Noiri, Unified operation approach of general-ized closed sets via topological ideal, Math. Japanica, 49, (1999), 395–401]Search in Google Scholar
[[2] W. Dunham,
*−T12$* - T_{{1 \over 2}}$-spaces, Kyungpook Math. Jour., 17(2), (1977), 161–169]Search in Google Scholar
[[3] D. Jancovic and T. R. Hamlett, New topologies from old via ideals, Amer. Math. Monthy, 97, (1990), 295–31010.1080/00029890.1990.11995593]Search in Google Scholar
[[4] K. Kuratowski, Topologie, Vol I, Warszawa, 1933]Search in Google Scholar
[[5] N. Levine, Generalized closed sets in topology, Rend. Circ. Mat. Palermo, 19(2), (1970), 89–9610.1007/BF02843888]Search in Google Scholar
[[6] H. Maki, Generalized ∧-sets and the associated closure operators, Special Iss. Commemoration of Prof. K. Ikeda’s Retirement, (1986), 139–146]Search in Google Scholar
[[7] D. Mandal and M. N. Mukherjee, Certain new classes of generalized closed sets and their applications in ideal topological spaces, Filomat, 29(5), (2015), 1113–112010.2298/FIL1505113M]Search in Google Scholar
[[8] M. Navaneethakrishnan and J. P. Joseph, g-closed sets in ideal topological spaces, Acta. Math. Hunger., 119, (2008), 365–37110.1007/s10474-007-7050-1]Search in Google Scholar
[[9] M. Navaneethakrishnan and D. Sivaraj, ℐg-Closed sets and Tℐ-space, Jour. Adv. Res. Pure Math., 1(2), (2009), 41–49]Search in Google Scholar
[[10] M. Rajamani, V. Inthumathy, and S. Krishnaprakash, Strongly-ℐ-closed sets and decompositions of *-continuity, Acta Math. Hungar., 130(4), (2011), 358–36210.1007/s10474-010-0011-0]Search in Google Scholar
[[11] R. Vaidyanathaswamy, The localization theory in set topology, Proc. Indian Acad. Sci. Sect. A,20, (1944), 51–6110.1007/BF03048958]Search in Google Scholar