The hierarchy theorem for generalized quantifiers

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Journal of Symbolic Logic 61 (3):802-817 (1996)
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Abstract

The concept of a generalized quantifier of a given similarity type was defined in [12]. Our main result says that on finite structures different similarity types give rise to different classes of generalized quantifiers. More exactly, for every similarity typetthere is a generalized quantifier of typetwhich is not definable in the extension of first order logic by all generalized quantifiers of type smaller thant. This was proved for unary similarity types by Per Lindström [17] with a counting argument. We extend his method to arbitrary similarity types.

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10.2307/2275786

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Jouko A Vaananen
University of Helsinki

Citations of this work

Definability of polyadic lifts of generalized quantifiers.Lauri Hella, Jouko Väänänen & Dag Westerståhl - 1997 - Journal of Logic, Language and Information 6 (3):305-335.

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References found in this work

Vector spaces and binary quantifiers.Michał Krynicki, Alistair Lachlan & Jouko Väänänen - 1984 - Notre Dame Journal of Formal Logic 25 (1):72-78.
Definability hierarchies of general quantifiers.Lauri Hella - 1989 - Annals of Pure and Applied Logic 43 (3):235.

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