Riesz and pre-Riesz monoids

Abstract

Call a directed partially ordered cancellative divisibility monoid M a Riesz monoid if for all x,y1,y2≥ 0 in M, x≤ y1+y2⇒ x=x1+x2 where 0≤ xi≤ yi. We explore the necessary and sufficient conditions under which a Riesz monoid % M with M+=\x≥ 0|x∈ M\=M generates a Riesz group and indicate some applications. We call a directed p.o. monoid M -pre-Riesz if % M+=M and for all x1,x2,...,xn∈ M, % glb(x1,x2,...,xn)=0 or there is r∈ such that 0<r≤ x1,x2,...,xn, for some subset of M. We explore examples of -pre-Riesz monoids of -ideals of different types. We show for instance that if M is the monoid of nonzero (integral) ideals of a Noetherian domain D and the set of invertible ideals, M is -pre-Riesz if and only D is a Dedekind domain. We also study factorization in pre-Riesz monoids of a certain type and link it with factorization theory of ideals in an integral domain.

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