Nonvaluational ordered Abelian groups of finite burden
Abstract
Consider an expansion R=(R,<,+,…) of an ordered divisible Abelian group of finite burden defining no nonempty subset X of R which is dense and codense in a definable open subset U of R with X ⊂eq U. We further assume that R is nonvaluational, that is, for every nonempty definable subsets A,B of R with A <B and A B=R, ∈f\b-a\;|\;a ∈ A, b ∈ B\=0. Then, R is *-locally weakly o-minimal. We also give a complete description of sets definable in a definably complete expansion of ordered group of burden two if it defines an infinite discrete set.
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