与规定积环元素等价的共元单环

Pub Date : 2023-07-19 DOI:10.4064/fm232-8-2023

P. D'Aquino, A. Macintyre

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引用次数: 0

摘要

费弗曼-沃特的经典著作对（广义）积结构和某些相关的丰富布尔结构的可定义性进行了有力的构造性分析。从成分结构中的可定义性来看%结构。在这里，通过密切相关的方法，但在换元单值环的特殊设置中，我们得到了一种反证，使我们能够在有趣的情况下确定换元单值环 R 何时在元素上等价于换元单值环 R_i 族的非琐积。我们将其用于皮亚诺算术模型的残差环的模型论分析。

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Commutative unital rings elementarily equivalent to prescribed product rings

The classical work of Feferman Vaught gives a powerful, constructive analysis of definability in (generalized) product structures, and certain associated enriched Boolean structures. %structures in terms of definability in the component structures. Here, by closely related methods, but in the special setting of commutative unital rings, we obtain a kind of converse allowing us to determine in interesting cases, when a commutative unital R is elementarily equivalent to a nontrivial product of a family of commutative unital rings R_i. We use this in the model theoretic analysis of residue rings of models of Peano Arithmetic.

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