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  1. (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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  • Independence and the finite submodel property.Vera Koponen - 2009 - Annals of Pure and Applied Logic 158 (1-2):58-79.
    We study a class of 0-categorical simple structures such that every M in has uncomplicated forking behavior and such that definable relations in M which do not cause forking are independent in a sense that is made precise; we call structures in independent. The SU-rank of such M may be n for any natural number n>0. The most well-known unstable member of is the random graph, which has SU-rank one. The main result is that for every strongly independent structure M (...)
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  • Multidimensional Exact Classes, Smooth Approximation and Bounded 4-Types.Daniel Wolf - 2020 - Journal of Symbolic Logic 85 (4):1305-1341.
    In connection with the work of Anscombe, Macpherson, Steinhorn and the present author in [1] we investigate the notion of a multidimensional exact class (R-mec), a special kind of multidimensional asymptotic class (R-mac) with measuring functions that yield the exact sizes of definable sets, not just approximations. We use results about smooth approximation [24] and Lie coordinatization [13] to prove the following result (Theorem 4.6.4), as conjectured by Macpherson: For any countable language$\mathcal {L}$and any positive integerdthe class$\mathcal {C}(\mathcal {L},d)$of all (...)
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