TITLE:
Regular Elements of the Complete Semigroups BX(D) of Binary Relations of the Class ∑2(X,8)
AUTHORS:
Nino Tsinaridze, Shota Makharadze
KEYWORDS:
Semilattice, Semigroup, Binary Relation
JOURNAL NAME:
Applied Mathematics,
Vol.6 No.3,
March
3,
2015
ABSTRACT: As we know if D is a complete X-semilattice of unions then semigroup Bx(D) possesses a right unit iff D is an XI-semilattice of unions. The investigation of those a-idempotent and regular elements of semigroups Bx(D) requires an investigation of XI-subsemilattices of semilattice D for which V(D,a)=Q∈∑2(X,8) . Because the semilattice Q of the class ∑2(X,8) are not always XI -semilattices, there is a need of full description for those idempotent and regular elements when V(D,a)=Q . For the case where X is a finite set we derive formulas by calculating the numbers of such regular elements and right units for which V(D,a)=Q .