Vaught’s conjecture for weakly -minimal theories of finite convexity rank
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Publication:5112467
DOI10.1070/IM8894zbMath1481.03023OpenAlexW2973939694MaRDI QIDQ5112467
Publication date: 29 May 2020
Published in: Izvestiya: Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1070/im8894
Models with special properties (saturated, rigid, etc.) (03C50) Model theory of ordered structures; o-minimality (03C64) Model theory of denumerable and separable structures (03C15)
Related Items (4)
On almost omega-categoricity of weakly o-minimal theories ⋮ Countable models of complete ordered theories ⋮ A criterion for binarity of almost \(\omega \)-categorical weakly \(o \)-minimal theories ⋮ Algebras of distributions of binary isolating formulas for almost \(\omega \)-categorical weakly \(o\)-minimal theories
Cites Work
- Vaught's conjecture for quite o-minimal theories
- Criterion for binarity of \(\aleph_{0}\)-categorical weakly o-minimal theories
- Vaught's conjecture for weakly o-minimal theories of convexity rank 1
- Countably categorical quite o-minimal theories
- Expansion of a model of a weakly o-minimal theory by a family of unary predicates
- Vaught's conjecture for o-minimal theories
- Weakly o-minimal structures and some of their properties
- Weakly o-minimal structures and real closed fields
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