Generic derivations on o-minimal structures

IF 0.9 1区 数学 Q1 LOGIC Journal of Mathematical Logic Pub Date : 2019-05-17 DOI:10.1142/s0219061321500070
A. Fornasiero, E. Kaplan
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引用次数: 12

Abstract

Let $T$ be a complete, model complete o-minimal theory extending the theory RCF of real closed ordered fields in some appropriate language $L$. We study derivations $\delta$ on models $\mathcal{M}\models T$. We introduce the notion of a $T$-derivation: a derivation which is compatible with the $L(\emptyset)$-definable $\mathcal{C}^1$-functions on $\mathcal{M}$. We show that the theory of $T$-models with a $T$-derivation has a model completion $T^\delta_G$. The derivation in models $(\mathcal{M},\delta)\models T^\delta_G$ behaves "generically," it is wildly discontinuous and its kernel is a dense elementary $L$-substructure of $\mathcal{M}$. If $T =$ RCF, then $T^\delta_G$ is the theory of closed ordered differential fields (CODF) as introduced by Michael Singer. We are able to recover many of the known facts about CODF in our setting. Among other things, we show that $T^\delta_G$ has $T$ as its open core, that $T^\delta_G$ is distal, and that $T^\delta_G$ eliminates imaginaries. We also show that the theory of $T$-models with finitely many commuting $T$-derivations has a model completion.
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o-极小结构上的泛型导数
设$T$是一个完备的、模型完备的0 -极小理论,将实闭有序域的理论RCF推广到适当的语言$L$。我们研究了模型$\mathcal{M}\模型T$上的导数$\delta$。我们引入了$T$-派生的概念:一个与$L(\emptyset)$-可定义的$\mathcal{C}^1$-函数在$\mathcal{M}$上兼容的派生。我们证明了具有$T$派生的$T$-模型理论具有$T^\delta_G$的模型完备性。模型$(\mathcal{M},\delta) $模型T^\delta_G$中的推导具有“一般”性质,它是广泛不连续的,其核是$\mathcal{M}$的密集初等$L$-子结构。如果$T =$ RCF,则$T^\delta_G$是Michael Singer引入的闭有序微分场(CODF)理论。我们能够在我们的设置中恢复许多关于CODF的已知事实。除此之外,我们证明了$T^\delta_G$以$T$为开核,$T^\delta_G$是远端的,并且$T^\delta_G$消除了虚数。我们还证明了具有有限多个可交换$T$派生的$T$-模型理论具有模型完备性。
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来源期刊
Journal of Mathematical Logic
Journal of Mathematical Logic MATHEMATICS-LOGIC
CiteScore
1.60
自引率
11.10%
发文量
23
审稿时长
>12 weeks
期刊介绍: The Journal of Mathematical Logic (JML) provides an important forum for the communication of original contributions in all areas of mathematical logic and its applications. It aims at publishing papers at the highest level of mathematical creativity and sophistication. JML intends to represent the most important and innovative developments in the subject.
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