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  1. Coordinatisation and canonical bases in simple theories.Bradd Hart, Byunghan Kim & Anand Pillay - 2000 - Journal of Symbolic Logic 65 (1):293-309.
    In this paper we discuss several generalization of theorems from stability theory to simple theories. Cherlin and Hrushovski, in [2] develop a substitute for canonical bases in finite rank, ω-categorical supersimple theories. Motivated by methods there, we prove the existence of canonical bases (in a suitable sense) for types in any simple theory. This is done in Section 2. In general these canonical bases will (as far as we know) exist only as “hyperimaginaries”, namely objects of the forma/Ewhereais a possibly (...)
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  • (1 other version)Interpreting Groups in $\omega$-Categorical Structures.Dugald Macpherson - 1991 - Journal of Symbolic Logic 56 (4):1317-1324.
    It is shown that no infinite group is interpretable in any structure which is homogeneous in a finite relational language. Related questions are discussed for other $\omega$-categorical structures.
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  • ℵ0-Categorical, ℵ0-stable structures.Gregory Cherlin, Leo Harrington & Alistair H. Lachlan - 1985 - Annals of Pure and Applied Logic 28 (2):103-135.
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  • Finite Homogeneous 3‐Graphs.Alistair H. Lachlan & Allyson Tripp - 1995 - Mathematical Logic Quarterly 41 (3):287-306.
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  • (1 other version)[Introduction].Wilfrid Hodges - 1986 - Journal of Symbolic Logic 51 (4):865.
    We consider two formalisations of the notion of a compositionalsemantics for a language, and find some equivalent statements in termsof substitutions. We prove a theorem stating necessary and sufficientconditions for the existence of a canonical compositional semanticsextending a given partial semantics, after discussing what features onewould want such an extension to have. The theorem involves someassumptions about semantical categories in the spirit of Husserl andTarski.
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  • Finite Satisfiability and N₀-Categorical Structures with Trivial Dependence.Marko Djordjević - 2006 - Journal of Symbolic Logic 71 (3):810 - 830.
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  • (1 other version)Interpreting groups in ω-categorical structures.Dugald Macpherson - 1991 - Journal of Symbolic Logic 56 (4):1317-1324.
    It is shown that no infinite group is interpretable in any structure which is homogeneous in a finite relational language. Related questions are discussed for other ω-categorical structures.
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  • Asymptotic probabilities of extension properties and random l -colourable structures.Vera Koponen - 2012 - Annals of Pure and Applied Logic 163 (4):391-438.
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  • (1 other version)[Introduction].Wilfrid Hodges - 1988 - Journal of Symbolic Logic 53 (1):1.
    We consider two formalisations of the notion of a compositionalsemantics for a language, and find some equivalent statements in termsof substitutions. We prove a theorem stating necessary and sufficientconditions for the existence of a canonical compositional semanticsextending a given partial semantics, after discussing what features onewould want such an extension to have. The theorem involves someassumptions about semantical categories in the spirit of Husserl andTarski.
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  • Countable homogeneous relational structures and ℵ0-categorical theories.C. Ward Henson - 1972 - Journal of Symbolic Logic 37 (3):494 - 500.
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  • The finite submodel property and ω-categorical expansions of pregeometries.Marko Djordjević - 2006 - Annals of Pure and Applied Logic 139 (1):201-229.
    We prove, by a probabilistic argument, that a class of ω-categorical structures, on which algebraic closure defines a pregeometry, has the finite submodel property. This class includes any expansion of a pure set or of a vector space, projective space or affine space over a finite field such that the new relations are sufficiently independent of each other and over the original structure. In particular, the random graph belongs to this class, since it is a sufficiently independent expansion of an (...)
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  • (2 other versions)Finite Structures with Few Types.Vera Koponen - 2008 - Bulletin of Symbolic Logic 14 (1):114-116.
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