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Article

Jakubík, Ján
On cut completions of abelian lattice ordered groups. (English). Czechoslovak Mathematical Journal, vol. 50 (2000), issue 3, pp. 587-602
MSC: 06F15, 06F20 | MR 1777479 | Zbl 1079.06507
Keywords:
abelian lattice ordered group; disjoint subset; cut completion; Dedekind completion
Summary:
We denote by $F_a$ the class of all abelian lattice ordered groups $H$ such that each disjoint subset of $H$ is finite. In this paper we prove that if $G \in F_a$, then the cut completion of $G$ coincides with the Dedekind completion of $G$.
References:
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[6] J. Jakubík: Generalized Dedekind completion of a lattice ordered group. Czechoslovak Math. J. 28 (1978), 294–311. MR 0552650
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