Model Theory

The Incompleteness Phenomenon Pub Date : 2018-10-08 DOI:10.1201/9781439863534-10

Anand Pillay

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引用次数: 1121

Abstract

group Aut(M). Stability and Diophantine Geometry A structure M is said to be unstable if it interprets a bipartite graph (P,Q,R) with the feature that for each n there are ai ∈ P and bi ∈ Q for i = 1, . . . , n such that R(ai, bj ) if and only if i < j. A complete theory is unstable if some (any) model is unstable. If M is unstable (witnessed by (P,Q,R) ) and saturated, then there are ai and bi for i = 1,2, . . . such that R(ai, bj ) if i < j. A structure or theory is stable if it is not unstable. By definition stability is an invariant of the bi-interpretability type. The connection between stability and IT is: if T is unstable, then IT (κ) = 2κ (the maximum possible) for all uncountable cardinals κ. So in the context of classifying the possible functions IT , it was natural to focus on stable theories. Stability is a very strong property. There are few natural examples of stable structures: abelian groups (G,+), algebraically closed and separably closed fields (K,+, · ), differentially closed fields (K,+, · ,D) . More recently it was realized that compact complex manifolds are also stable; the structure on the compact complex manifold X consists of the analytic subvarieties of X, X ×X,.... On the other hand, typically the structures considered in earlier sections, such as the real field and p-adic field, are

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模型理论

集团Aut (M)。如果一个结构M解释了一个二部图(P,Q,R)，其特征是对于每一个n都有ai∈P和bi∈Q，当i = 1，…， n使得R(ai, bj)当且仅当i < j。如果某个(任何)模型不稳定，则完全理论是不稳定的。如果M是不稳定的(由(P,Q,R)证明)并且是饱和的，那么对于i = 1,2，…，有ai和bi。如果i < j，则R(ai, bj)。如果结构或理论不稳定，则它是稳定的。根据定义，稳定性是双可解释类型的不变量。稳定性与IT之间的联系是:如果T是不稳定的，那么对于所有不可数基数κ， IT (κ) = 2κ(最大可能值)。因此，在对可能的IT功能进行分类的背景下，关注稳定理论是很自然的。稳定性是一种很强的特性。稳定结构的自然例子很少:阿贝尔群(G，+)，代数闭和可分闭域(K，+，·)，差分闭域(K，+，·，D)。最近人们认识到紧复流形也是稳定的;紧复流形X上的结构由X、X的解析子变量×X，....组成另一方面，通常在前面几节中考虑的结构，如实域和p进域，是

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