Article in volume

Authors:

D.A. Romano

Daniel Abraham Romano

International Mathematical Virtual Institute
kordunaska Street 6, 78000 Banja Luka, Bosnia and Herzegovina

email: daniel.a.romano@hotmail.com

0000-0003-1148-3258

Title:

A note on weak-interior and quasi-interior ideals in quasi-ordered semigroups

Source:

Discussiones Mathematicae - General Algebra and Applications 43(2) (2023) 233-239

Accepted: 2022-02-14 , Available online: 2023-01-11 , https://doi.org/10.7151/dmgaa.1414

Abstract:

Keywords:

quasi-ordered semigroup, ideal, interior ideal, weak-interior ideal and quasi-interior ideal

References:

1. W. Jantanan, O. Johdee and N. Praththong, Bi-interior ideals and interior ideals of ordered semigroups, in: The 14th National and International Sripatum University Conference (SPUCON2019) (pp. 2060–2069). Sripatum University, Bangkok, 2019.
2. N. Kehayopulu, Note on interior ideals, ideal elements in ordered semigroups, Sci. Math. 2 (3) (1999) 407–409.
3. N. Kehayopulu and M. Tsingelis, Fuzzy interior ideals in ordered semigroups, Lobachevskii J. Math. 21 (2006) 65–71.
4. S. Lajos, $(m;k;n)$-ideals in semigroups, in: Notes on Semigroups II, Karl Marx Univ. Econ., Dept. Math. Budapest 1 (1976) 12–19.
5. M.M. Krishna Rao, A study of generalization of bi-ideal, quasi-ideal and interior ideal of semigroup, Math. Morovica 22 (2) (2018) 103–115.
   https://doi.org/10.5937/MatMor1802103M
6. M.M. Krishna Rao, Quasi-interior ideals and fuzzy quasi-interior ideals of $Γ$-semirings, Ann. Fuzzy Math. Inform. 18 (1) (2019) 31–43.
   https://doi.org/10.30948/afmi.2019.18.1.31
7. M.M. Krishna Rao, Quasi-interior ideals and fuzzy quasi-interior ideals of semigroups, Ann. Fuzzy Math. Inform. 19 (2) (2020) 199–208.
   https://doi.org/10.30948/afmi.2020.19.2.199
8. G. Szasz, Interior ideals in semigroups, in: Notes on Semigroups, Karl Marx Univ. Econ., Dept. Math. Budapest 5 (1977) 1–7.
9. G. Szasz, Remark on interior ideals of semigroups, Studia Sci. Math. Hung. 16 (1981) 61–63.