The theories of Baldwin–Shi hypergraphs and their atomic models

Archive for Mathematical Logic 60 (7):879-908 (2021)
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Abstract

We show that the quantifier elimination result for the Shelah-Spencer almost sure theories of sparse random graphs G(n,nα)G(n,n^{-\alpha }) given by Laskowski (Isr J Math 161:157–186, 2007) extends to their various analogues. The analogues will be obtained as theories of generic structures of certain classes of finite structures with a notion of strong substructure induced by rank functions and we will call the generics Baldwin–Shi hypergraphs. In the process we give a method of constructing extensions whose ‘relative rank’ is negative but arbitrarily small in context. We give a necessary and sufficient condition for the theory of a Baldwin–Shi hypergraph to have atomic models. We further show that for certain well behaved classes of theories of Baldwin–Shi hypergraphs, the existentially closed models and the atomic models correspond.

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10.1007/s00153-021-00765-8

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References found in this work

Stable generic structures.John T. Baldwin & Niandong Shi - 1996 - Annals of Pure and Applied Logic 79 (1):1-35.
DOP and FCP in generic structures.John Baldwin & Saharon Shelah - 1998 - Journal of Symbolic Logic 63 (2):427-438.
CM-triviality and relational structures.Viktor Verbovskiy & Ikuo Yoneda - 2003 - Annals of Pure and Applied Logic 122 (1-3):175-194.

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