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DTSTART:20190331T010000
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DTSTART:20191027T010000
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DTSTART;TZID=Europe/Paris:20190924T160000
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SUMMARY:H-structures
DESCRIPTION:A complete theory T is called geometric if the algebraic closure has the exchange property in all models of T and the theory eliminates the quantifier exists infinity. In such theories there is a rudimentary notion of independence given by algebraic independence. Examples of geometric theories include SU-rank one theories and dense o-minimal theories.An expansion of a model M of T by a unary predicate H is called dense-codense if for every finite dimensional subset A of M and every non algebraic type p(x) over A\, there is a realization of p(x) in H(M) and another one which is not algebraic over AH(M). A dense-codense expansion is called an H-structure if in addition H(M) is algebraically independent.In this talk we will talk about the basic properties of H-structures and how the new structure can be understood as a tame expansion of the original structure M. We will discuss groups definable in this expansion. We will also present some recent results on the special case when M is the ultrapower of a one-dimensional asymptotic class.This talk includes joint work with E. Vassiliev and D. Garcia and T. Zou.
URL:https://www.math.ens.psl.eu/evenement/h-structures/
LOCATION:Sophie Germain salle 2015
CATEGORIES:Théorie des Modèles et Groupes
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