Groupoid Factorizations in the Semigroup of Binary Systems

Abstract

Let (X, ) be a groupoid (binary algebra) and Bin(X) denote the collection of all groupoids defined on X. We introduce two methods of factorization for this binary system under the binary groupoid product \ in the semigroup ( Bin( X) , ) . We conclude that a strong non-idempotent groupoid can be represented as a product of its % similar- and signature- derived factors. Moreover, we show that a groupoid with the orientation property is a product of its orient- and skew- factors. These unique factorizations can be useful for various applications in other areas of study. Application to algebras such as B/BCH/BCI/BCK/BH/BI/d-algebra are widely given throughout this paper.