A pretorsion theory for right groups
Abstract
Let S be a right group. Then there exist two congruences and on S such that S is the product of its quotient semigroups S/ and S/, where S/ is a group and S/ is a right zero semigroup. If E is the set of all idempotents of S and we fix an element e0∈ E, then the pointed right group (S,e0) is the coproduct of its pointed subsemigroups (Se0,e0) and (E,e0) in the category of pointed right groups. In general, there is a pretorsion theory in the category of right groups in which the torsion objects are right zero semigroups and the torsion-free objects are groups.
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