Groupes equationnellement minimaux

dc.contributor.authorBruno, Poizat
dc.date.accessioned2019-04-03T10:20:27Z
dc.date.available2019-04-03T10:20:27Z
dc.date.issued2013
dc.description.abstractA well-known definition in Model Theory states that an infinite structure M is minimal if any subset of M which is definable with parameters in M is either finite or cofinite. The starting point of the study of the groups of finite Morley rank is a theorem due to Reineke, saying that a minimal group is commutative. We introduce here a weaker notion, easily understandable by non-logicians : an infinite group G is equationally minimal if every equation in one variable, with coefficients in G, has in G either a finite or a cofinite number of solutions. Non-commutative equationally minimal groups probably exists: they will be non locally finite groups of exponent p, for a sufficiently large prime number p.ru_RU
dc.identifier.citationBruno Poizat. Groupes equationnellement minimaux /Poizat Bruno //Қарағанды универисетінің хабаршысы. Математика сериясы.=Вестник Карагандинского университета. Серия Математика=Bulletin of the Karaganda University. Mathematics Series.-2013.-№1.-Р.86-89ru_RU
dc.identifier.issn0142-0843
dc.identifier.urihttps://rep.buketov.edu.kz:80//handle/data/4770
dc.language.isoenru_RU
dc.publisherYe.A.Buketov Karaganda State University Publishing houseru_RU
dc.relation.ispartofseriesBulletin of the Karaganda University. Mathematics Series;№1(69)/2013
dc.subjectmodèlesru_RU
dc.subjectReinekeru_RU
dc.subjectMorleyru_RU
dc.subjectéquationnellement minimal grouperu_RU
dc.subjectabélienru_RU
dc.subjectinfini nilpotentru_RU
dc.subjectcentralisateurru_RU
dc.titleGroupes equationnellement minimauxru_RU
dc.title.alternativeМинималды эквационалды группаларru_RU
dc.title.alternativeМинимально эквациональные группыru_RU
dc.typeArticleru_RU

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