Characterizations of regularities in ordered semihypergroups in terms of some generalized union soft hyperideals
Authors
J. Mekwian
- Division of Mathematics, Faculty of Engineering, Rajamangala University of Technology Isan, Khon Kaen Campus, Khon Kaen 40000, Thailand.
S. Lekkoksung
- Division of Mathematics, Faculty of Engineering, Rajamangala University of Technology Isan, Khon Kaen Campus, Khon Kaen 40000, Thailand.
N. Lekkoksung
- Division of Mathematics, Faculty of Engineering, Rajamangala University of Technology Isan, Khon Kaen Campus, Khon Kaen 40000, Thailand.
Abstract
A soft set of \(E\) over \(U\) is a mapping from \(E\) to the set of all subsets of \(U\).
There are many studies that apply the concept of soft sets to investigate the properties of some algebraic structures.
The notions of \((M, N)\)-union soft left (resp., right) hyperideals in ordered semihypergroups were introduced by Farooq, Khalaf, and Khan.
These concepts are generalizations of uni-soft left and right hyperideals.
Ordered semihypergroups can be characterized by many mathematical concepts, such as their hyperideals, fuzzy hyperideals, and soft hyperideals.
In this paper, we apply the notions of \((M, N)\)-union soft left (resp., right) hyperideals to characterize some regularities of ordered semihypergroups: regular, weakly regular, and intra-regular ordered semihypergroups.
Share and Cite
ISRP Style
J. Mekwian, S. Lekkoksung, N. Lekkoksung, Characterizations of regularities in ordered semihypergroups in terms of some generalized union soft hyperideals, Journal of Mathematics and Computer Science, 26 (2022), no. 3, 309--321
AMA Style
Mekwian J., Lekkoksung S., Lekkoksung N., Characterizations of regularities in ordered semihypergroups in terms of some generalized union soft hyperideals. J Math Comput SCI-JM. (2022); 26(3):309--321
Chicago/Turabian Style
Mekwian, J., Lekkoksung, S., Lekkoksung, N.. "Characterizations of regularities in ordered semihypergroups in terms of some generalized union soft hyperideals." Journal of Mathematics and Computer Science, 26, no. 3 (2022): 309--321
Keywords
- Ordered semihypergroup
- \((M, N)\)-union soft left hyperideal
- \((M, N)\)-union soft right hyperideal
- regular
- weakly regular
- intra-regular
MSC
References
-
[1]
S. Anvariyeh, S. Mirvakili, B. Davvaz, On $\Gamma$-hyperideals in $\Gamma$-semihypergroups, Carpathian J. Math., 26 (2010), 11--23
-
[2]
P. Bonansinga, P. Corsini, On semihypergroup and hypergroup homomorphisms, Boll. Un. Mat. Ital. B (6), 1 (1982), 717--727
-
[3]
P. Corsini, Prolegomena of hypergroup theory, Supplement to Riv. Mat. Pura Appl. Aviani Editore, Tricesimo (1993)
-
[4]
P. Corsini, V. Leoreanu, Applications of hyperstructure theory, Kluwer Academic Publishers, Dordrecht (2003)
-
[5]
B. Davvaz, P. Corsini, T. Changphas, Relationship between ordered semihypergroups and ordered semigroups by using pseudoorder, European J. Combin., 44 (2015), 208--217
-
[6]
B. Davvaz, A. Khan, M. Farooq, Int-soft structures applied to ordered semihypergroups, Matematiche (Catania), 73 (2018), 235--259
-
[7]
M. Farooq, M. Khalaf, A. Khan, More generalizations of union soft hyperideals of ordered semihypergroups, Kragujevac J. Math., 48 (2024), 287--307
-
[8]
Z. Gu, On weakly semiprime segments of ordered semihypergroups, AIMS Math., 6 (2021), 9882--9885
-
[9]
Z. Gu, X. L. Tang, Ordered regular equivalence relations on ordered semihypergroups, J. Algebra, 450 (2016), 384--397
-
[10]
D. Heidari, B. Davvaz, On ordered hyperstructures, Politehn. Univ. Bucharest Sci. Bull. Ser. A Appl. Math. Phys., 73 (2011), 85--96
-
[11]
K. Hila, B. Davvaz, J. Dine, Study on the structure of $\Gamma$-semihypergroups, Comm. Algebra, 40 (2012), 2932--2948
-
[12]
Soft ordered semigroups, Y. B. Jun, K. J. Lee, A. Khan, MLQ Math. Log. Q., 56 (2010), 42--50
-
[13]
Y. B. Jun, S. Z. Song, G. Muhiuddin, Concave soft sets, critical soft points, and union-soft ideals of ordered semigroups, Sci. World J., 2014 (2014), 12 pages
-
[14]
L. Kamali Ardekani, B. Davvaz, Ordered semihypergroup constructions, Bol. Mat., 25 (2018), 77--99
-
[15]
N. Kehayopulu, Left regular and intra-regular ordered hypersemigroups in terms of semiprime and fuzzy semiprime subsets, Sci. Math. Jpn., 80 (2017), 295--305
-
[16]
N. Kehayopulu, From ordered semigroups to ordered hypersemigroups, Turkish J. Math., 43 (2019), 21--35
-
[17]
A. Khan, M. Farooq, B. Davvaz, Int-soft interior hyperideals of ordered semihypergroups, Int. J. Anal. Appl., 14 (2017), 193--202
-
[18]
A. Khan, M. Farooq, H. U. Khan, Uni-soft hyperideals of ordered semihypergroups, J. Intell. Fuzzy Systems, 35 (2018), 4557--5471
-
[19]
A. Khan, M. Farooq, N. Yaqoob, Uni-soft structures applied to ordered $\Gamma$-semihypergroups, Proc. Nat. Acad. Sci. India Sect. A, 90 (2020), 457--465
-
[20]
A. Khan, Y. B. Jun, S. I. Ali Shah, R. Khan, Applications of soft union sets in ordered semigroups via uni-soft quasi-ideals, J. Intell. Fuzzy Systems, 30 (2016), 97--107
-
[21]
A. Khan, R. Khan, Y. B. Jun,, Uni-soft structure applied to ordered semigroups, Soft Comput., 21 (2017), 1021--1030
-
[22]
S. Naz, M. Shabir, On soft semihypergroups, J. Intell. Fuzzy Systems, 26 (2014), 2203--2213
-
[23]
T. Mahmood, Some contributions to semihypergroups, PhD thesis, Department of Mathematics, Quaid-i-Azm University, Islamabad, Pakistan (2011)
-
[24]
F. Marty, Sur une generalization de la notion de groupe, In 8th congress Math. Scandinaves, 1934 (1934), 45--49
-
[25]
D. Molodtsov, Soft set theory-first results, Comput. Math. Appl., 37 (1999), 19--31
-
[26]
J. Tang, N. Yaqoob, A novel investigation on fuzzy hyperideals in ordered $*$-semihypergroups, Comput. Appl. Math., 40 (2021), 24 pages
-
[27]
N. Yaqoob, P. Corsini, F. Yousafzai, On intra-regular left almost semihypergroups with pure left identity, J. Math., 2013 (2013), 10 pages
-
[28]
N. Yaqoob, I. Cristea, M. Gulistan, S. Nawaz, Left almost polygroups, Ital. J. Pure Appl. Math., 39 (2018), 465--474
-
[29]
P. Yiarayong, B. Davvaz, R. Chinram, On right chain ordered semihypergroups, J. Math. Computer Sci., 24 (2022), 59-72
