关于拟极小群的交换性

Publications De L'institut Mathematique Pub Date : 1900-01-01 DOI:10.2298/PIM150510030M

Slavko Moconja

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引用次数: 2

摘要

研究了是否每个拟极小群都是阿贝尔群，并给出了一个拟极小纯群具有φ可定义偏序且链不可数的正解。我们还讨论了可数语言完备理论的两个性质:拟极小模型的存在性和强正则型的存在性。由此导出了拟极小群的交换性猜想与正则群的交换性猜想的等价性。

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On commutativity of quasi-minimal groups

We investigate if every quasi-minimal group is abelian, and give a positive answer for a quasi-minimal pure group having a ∅-definable partial order with uncountable chains. We also relate two properties of a complete theory in a countable language: the existence of a quasi-minimal model and the existence of a strongly regular type. As a consequence we derive the equivalence of conjectures on commutativity of quasi-minimal groups and commutativity of regular groups.

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Publications De L'institut Mathematique

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