Algebras of Distributions of Binary Isolating Formulas for Quite o-Minimal Theories

D Yu Emel’Yanov,S V Sudoplatov,B Sh Kulpeshov

doi:10.1007/s10469-019-09515-5

Algebras of Distributions of Binary Isolating Formulas for Quite o-Minimal Theories

D Yu Emel’Yanov, S V Sudoplatov + Show 1 more

https://doi.org/10.1007/s10469-019-09515-5

Copy DOI

Journal: Algebra and Logic	Publication Date: Jan 1, 2019
Citations: 7

Affiliation: Institute of Mathematics and Mathematical Modeling, Novosibirsk State Technical University, Sobolev Institute of Mathematics, Novosibirsk State University, Kazakh-British Technical University, International Information Technologies University

#O-minimal Theories #Countable Models + Show 2 more

Abstract
Full-Text PDF
Similar Papers

Abstract

Algebras of distributions of binary isolating formulas over a type for quite o-minimal theories with nonmaximal number of countable models are described. It is proved that an isomorphism of these algebras for two 1-types is characterized by the coincidence of convexity ranks and also by simultaneous satisfaction of isolation, quasirationality, or irrationality of those types. It is shown that for quite o-minimal theories with nonmaximum many countable models, every algebra of distributions of binary isolating formulas over a pair of nonweakly orthogonal types is a generalized commutative monoid.

Full Text