Right regular triples of semigroups
Abstract
Let M(S; ; P) denote a Rees I× matrix semigroup without zero over a semigroup S, where I is a singleton. If θ S denotes the kernel of the right regular representation of a semigroup S, then a triple A, B, C of semigroups is said to be right regular, if there are mappings APB and BP'C such that M(A; B; P)/θ M(A; B; P) M(C; B; P'). In this paper we examine right regular triples of semigroups.
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