Cuts of an ordered abelian group
Abstract
In this article, we study the cuts of a totally ordered abelian group . We begin by recalling some results on ordered sets I and on the associated sets IS(I) and FS(I) of initial and final segments of I. For a totally ordered set I we review the notion of an I-structure defined on a module over a ring R, and the definition of the Hahn product of a family of R-modules indexed by I. The set Cv()of convex subgroups of a totally ordered group is also a totally ordered set, canonically isomorphic to the set of cuts of the subset Pr()of principal convex subgroups. One of the first results is then to equip the group with an I-structure where I is the set Pr() endowed with the opposite order. We associate a convex subgroup with every cut of the group , and conversely, we can associate a family of cuts with every convex subgroup of . It is by looking at these subgroups, and the I-structure of that we can obtain a classification of the different types of cuts.
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