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Sains Malaysiana 48(12)(2019): 2817–2830 http://dx.doi.org/10.17576/jsm-2019-4812-23 A
New Classification (Pengelasan Baru Hemirings melalui h-Ideals
Lembut-Dua Kerangka) FAIZ MUHAMMAD KHAN1,4*,NIEYUFENGU1, HIDAYAT ULLAH KHAN2 & ASGHAR KHAN3 1Department of Applied Mathematics, School of Natural and Applied Sciences, Northwestern Polytechnical University Xi'an, Shaanxi, PR China
2Department of Mathematics, University of Malakand, Lower Dir Chakddara, KP, Pakistan
3Department of Mathematics, Abdul Wali Khan University Mardan, Mardan, KP, Pakistan
4Department
of Mathematics and Statistics, University of Swat, KP, Pakistan Received: 21 February 2019/Accepted:
23 December 2019 ABSTRACT Due
to lack of parameterization, various ordinary uncertainty theories
like theory of fuzzy sets, and theory of probability cannot solve
complicated problems of economics and engineering involving uncertainties.
The aim of the present paper was to provide an
appropriate mathematical tool for solving such type of complicated
problems. For the said purpose, the notion of double-framed soft
sets in hemirings is introduced. As h-ideals of hemirings
play a central role in the structural theory, therefore, we developed a new type of subsystem of
hemirings. Double-framed soft left (right)
h-ideals, double-framed soft h-bi-ideals and double-framed
soft h-quasi-ideals
of hemiring R are determined.
These concepts are elaborated through suitable examples. Furthermore,
we are bridging ordinary h-ideals and
double-framed soft h-ideals of hemirings through double-framed soft including sets and characteristic
double-framed soft functions. It is also shown that every double-framed
soft h-quasi-ideal is
double-framed soft h-bi-ideal but the
converse inclusion does not hold. A well-known class of hemrings
i.e. h-hemiregular
hemirings is characterized by the properties
of these newly developed double-framed soft h-ideals of R. Keywords: DFS h-bi-ideal;
DFS h-hemiregularhemirin;
DFS h-quasi-idealg; DFS sets; h-ideals ABSTRAK Disebabkan oleh kekurangan
pemparameteran, pelbagai
teori ketidakpastian biasa seperti teori
set kabur dan
teori kebarangkalian tidak boleh menyelesaikan
masalah ekonomi
dan kejuruteraan yang rumit yang melibatkan ketidakpastian. Tujuan penulisan kertas
ini adalah untuk menyediakan satu alat matematik
yang sesuai untuk
menyelesaikan masalah rumit yang sedemikian. Untuk tujuan tersebut,
satu tanggapan
set lembut dual kerangka dalam hemirings diperkenalkan. Oleh kerana h-ideals hemiring memainkan
peranan utama
dalam teori struktur,
maka kami telah
membangunkan satu jenis subsistem hemiring baru.
h-ideals lembut kiri (kanan) dual kerangka, h-dwi-ideal lembut dual kerangka dan h-separa-ideal lembut dual kerangka hemirings ditentukan.
Konsep
ini dihuraikan melalui contoh yang sesuai. Selain itu, kami menghubungkan h-ideals biasa dan h-ideals
lembut dual kerangka
hemirings melalui set lembut dual kerangka dan pencirian fungsi
lembut dual kerangka.
Kajian ini juga menunjukkan bahawa setiap h-quasi-ideal
lembut dual bingkai
adalah h-dwi-ideal lembut dual kerangka tetapi rangkuman akas tidak dapat bertahan.
Satu
kelas hemirings terkenal iaitu h-hemisekata hemirings dicirikan
oleh sifat h-ideals
dua bingkai
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