Open AccessOn smallest (generalized) ideals and semilattices of (2,2)-regular non-associative ordered semigroups
Author(s) -
Mohammed M. Khalaf,
Faisal Yousafzai,
Muhammed Danish Zia
Publication year - 2022
Publication title -
boletim da sociedade paranaense de matemática
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.347
H-Index - 15
eISSN - 2175-1188
pISSN - 0037-8712
DOI - 10.5269/bspm.42419
Subject(s) - associative property , mathematics , semigroup , unitary state , double groupoid , class (philosophy) , pure mathematics , fuzzy logic , algebra over a field , discrete mathematics , computer science , law , artificial intelligence , political science
An ordered AG-groupoid can be referred to as a non-associativeordered semigroup, as the main di¤erence between an ordered semigroup and anordered AG-groupoid is the switching of an associative law. In this paper, wede
ne the smallest left (right) ideals in an ordered AG-groupoid and use them tocharacterize a (2; 2)-regular class of a unitary ordered AG-groupoid along with itssemilattices and (2 ;2 _q)-fuzzy left (right) ideals. We also give the conceptof an ordered A*G**-groupoid and investigate its structural properties by usingthe generated ideals and (2 ;2 _q)-fuzzy left (right) ideals. These concepts willverify the existing characterizations and will help in achieving more generalizedresults in future works.