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VARIATIONS SUR UN THÈME DE ALDAMA ET SHELAH

Published online by Cambridge University Press:  22 January 2016

CÉDRIC MILLIET*
Affiliation:
UNIVERSITÉ GALATASARAY FACULTÉ DE SCIENCES ET DE LETTRES DÉPARTEMENT DE MATHÉMATIQUES ÇIRAĞAN CADDESI N°36 34357 ORTAKÖY, İSTANBUL,TÜRKIYE UNIVERSITÄT KONSTANZ FACHBEREICH MATEMATIK UND STATISTIK 78457 KONSTANZ, GERMANY PÔLE DE MATHÉMATIQUES DE L’INSA DE LYON BÂTIMENT LÉONARD DE VINCI 21, AVENUE JEAN CAPELLE 69621 VILLEURBANNE , FRANCEE-mail: cedric.milliet@insa-lyon.fr

Abstract

We consider a group G that does not have the independence property and study the definability of certain subgroups of G, using parameters from a fixed elementary extension G of G. If X is a definable subset of G, its trace on G is called an externally definable subset. If H is a definable subgroup of G, we call its trace on G an external subgroup. We show the following. For any subset A of G and any external subgroup H of G, the centraliser of A, the A-core of H and the iterated centres of H are external subgroups. The normaliser of H and the iterated centralisers of A are externally definable. A soluble subgroup S of derived length ℓ is contained in an S-invariant externally definable soluble subgroup of G of derived length ℓ. The subgroup S is also contained in an externally definable subgroup XG of G such that X generates a soluble subgroup of G of derived length ℓ. Analogue results are discussed when G is merely a type definable group in a structure that does not have the independence property.

Type
Articles
Copyright
Copyright © The Association for Symbolic Logic 2016 

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