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  1. What are logical notions?Alfred Tarski - 1986 - History and Philosophy of Logic 7 (2):143-154.
    In this manuscript, published here for the first time, Tarski explores the concept of logical notion. He draws on Klein's Erlanger Programm to locate the logical notions of ordinary geometry as those invariant under all transformations of space. Generalizing, he explicates the concept of logical notion of an arbitrary discipline.
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  • Definability and Invariance.A. A. M. Rodrigues & N. C. A. da Costa - 2007 - Studia Logica 86 (1):1-30.
    In his thesis 'Para uma Teoria Geral dos Homomorfismos' (1944) the Portuguese mathematician José Sebastião e Silva constructed an abstract or generalized Galois theory, that is intimately linked to F. Klein’s Erlangen Program and that foreshadows some notions and results of today’s model theory; an analogous theory was independently worked out by M. Krasner in 1938. In this paper, we present a version of the theory making use of tools which were not at Silva’s disposal. At the same time, we (...)
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  • (5 other versions)X Latin American Symposium on Mathematical Logic.Xavier Caicedo - 1996 - Bulletin of Symbolic Logic 2 (2):214-237.
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  • (2 other versions)A Model Theoretical Generalization of Steinitz’s Theorem.Alexandre Martins Rodrigues & Edelcio De Souza - 2011 - Principia: An International Journal of Epistemology 15 (1):107-110.
    Infinitary languages are used to prove that any strong isomorphism of substructures of isomorphic structures can be extended to an isomorphism of the structures. If the structures are models of a theory that has quantifier elimination, any isomorphism of substructures is strong. This theorem is a partial generalization of Steinitz’s theorem for algebraically closed fields and has as special case the analogous theorem for differentially closed fields. In this note, we announce results which will be proved elsewhere. DOI: 10.5007/1808-1711.2011v15n1p107.
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