Generic trivializations of geometric theories

Berenstein, Alexander; Vassiliev, Evgueni

doi:10.1002/malq.201300030

Cited by 5 publications

(6 citation statements)

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“…The condition of TEA/WTEA allows us to describe new definable sets in terms of old definable sets up to small sets. A version of the following result for sets of dimension one was central to many arguments on dense/codense pairs [3,5,6], in particular for understanding which model-theoretic properties transfer form T h(M) to T h(M, P). Proposition 2.6 Let (M, P) be a dense/codense-structure satisfying WTEA, let Z ⊂ M n be L-definable and let Y ⊂ Z be L P -definable.…”

Section: Properties Of Definable Sets and Types In Dense/codense Expansionsmentioning

confidence: 99%

“…In Sect. 6, we move into the setting of pairs (R, G) where R is a real closed field and G is a subgroup of R >0 or the unit circle S(R) with the Mann property. When G is interpreted as a subgroup of R >0 , we analyze the definable subgroups of G in the language of pairs and show that they are already definable in the pure ordered group language.…”

Section: Introductionmentioning

confidence: 99%

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Definable groups in dense pairs of geometric structures

Berenstein¹,

Vassiliev

2021

Arch. Math. Logic

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We study definable groups in dense/codense expansions of geometric theories with a new predicate P such as lovely pairs and expansions of fields by groups with the Mann property. We show that in such expansions, large (in the sense of dimension over the predicate) definable subgroups (the new language) of groups definable in the original language L are also L-definable, and definably amenable L-definable groups remain amenable in the expansion. We also show that if the underlying geometric theory is NIP, and G is a group definable in a model of T , then the (type-definable) connected component G 00 L P of G in the expansion agrees with the connected component G 00 in the original language. We prove similar preservation results for G ∩ P(M) n , the P-part of G in a lovely pair (M, P), and for subgroups of G in pairs (R, G) where R is a real closed field and G is a subgroup of R >0 or the unit circle S(R) with the Mann property. Keywords Unary predicate expansions • Definable groups • Amenable groups • Mann property • Connected component Mathematics Subject Classification 03C45 • 03C64A. Berenstein was partially supported by Colciencias' Project Teoría de modelos y dinámicas topológicas number 120471250707. E. Vassiliev was partially supported by the Ministry of Education and Science of the Republic of Kazakhstan (Grant AP05134992 Conservative extensions, countable ordered models, and closure operators). Both authors were also supported by the project Expansiones densas de teorías geométricas: grupos y medidas, Facultad de Ciencias, Universidad de los Andes. The authors thank Erik Walsberg for providing the proof for Proposition 4.11.

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Section: Properties Of Definable Sets and Types In Dense/codense Expansionsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Definable groups in dense pairs of geometric structures

Berenstein¹,

Vassiliev

2021

Arch. Math. Logic

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“…Let us consider the special case of measures of L H -definable subsets of H k with dimension k. By Lemma 2.7 a definable subset Y of H(M ) k is the set of solutions of a formula of the form (x ∈ H k ) ∧ θ(x, c), where c is a tuple from M and θ(x, ȳ) is an L-formula. Recall that H with the induced structure from M is a generic trivialization of M (see [4]) and that there is a nice correspondence between its theory T * and the theory T . For example T is supersimple of SU -rank 1 or strongly minimal if and only if T * is supersimple of SU -rank 1 or strongly minimal (see also [4]).…”

Section: Measure and Dimensionmentioning

confidence: 99%

“…Recall that H with the induced structure from M is a generic trivialization of M (see [4]) and that there is a nice correspondence between its theory T * and the theory T . For example T is supersimple of SU -rank 1 or strongly minimal if and only if T * is supersimple of SU -rank 1 or strongly minimal (see also [4]). If Y is a definable subset of H(M ) k of dimension k, the density property implies that generic properties of θ(x, c) hold for Y .…”

Section: Measure and Dimensionmentioning

confidence: 99%

H-structures and generalized measurable structures

Berentein¹,

García²,

Zou³

2020

Preprint

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“…(Pillay-Vassiliev, 2004), A. Berenstein and E. Vassiliev considered expansions of geometric theories by a unary predicate with density and extension properties and studied connection between properties of the original theory with properties of such expansions[48,49,50] (2010-2019).I 6 -weakly o-minimal theories [Macpherson-Marker-Steinhorn, Baizhanov, Verbovskiy, Kulpeshov, Aref'ev].…”

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confidence: 99%