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Natural deduction for generalized quantifiers

In J. van der Does & Van J. Eijck (eds.), Quantifiers, Logic, and Language. Stanford University. pp. 54--225 (1996)

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  1. On a decidable generalized quantifier logic corresponding to a decidable fragment of first-order logic.Natasha Alechina - 1995 - Journal of Logic, Language and Information 4 (3):177-189.
    Van Lambalgen (1990) proposed a translation from a language containing a generalized quantifierQ into a first-order language enriched with a family of predicatesR i, for every arityi (or an infinitary predicateR) which takesQxg(x, y1,..., yn) to x(R(x, y1,..., y1) (x,y1,...,yn)) (y 1,...,yn are precisely the free variables ofQx). The logic ofQ (without ordinary quantifiers) corresponds therefore to the fragment of first-order logic which contains only specially restricted quantification. We prove that it is decidable using the method of analytic tableaux. Related (...)
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  • Modal Foundations for Predicate Logic.Johan van Benthem - 1997 - Logic Journal of the IGPL 5 (2):259-286.
    The complexity of any logical modeling reflects both the intrinsic structure of a topic described and the weight of the formal tools. Some of this weight seems inherent in even the most basic logical systems. Notably, standard predicate logic is undecidable. In this paper, we investigate ‘lighter’ versions of this general purpose tool, by modally ‘deconstructing’ the usual semantics, and locating implicit choice points in its set up. The first part sets out the interest of this program and the modal (...)
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  • Preface.Jerry Seligman - 1995 - Journal of Logic, Language and Information 4 (3):175-176.
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  • Directions in Generalized Quantifier Theory.Dag Westerståhl & J. F. A. K. van Benthem - 1995 - Studia Logica 55 (3):389-419.
    We give a condensed survey of recent research on generalized quantifiers in logic, linguistics and computer science, under the following headings: Logical definability and expressive power, Polyadic quantifiers and linguistic definability, Weak semantics and axiomatizability, Computational semantics, Quantifiers in dynamic settings, Quantifiers and modal logic, Proof theory of generalized quantifiers.
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  • Temporal logic: Mathematical foundations and computational aspects, volume 2, Dov M. Gabbay, mark A. Reynolds, and Marcelo finger. [REVIEW]Ullrich Hustadt - 2001 - Journal of Logic, Language and Information 10 (3):406-410.
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  • Abductive Reasoning: Logical Investigations Into Discovery and Explanation.Atocha Aliseda - 2005 - Dordrecht and London: Springer.
    Abductive Reasoning: Logical Investigations into Discovery and Explanation is a much awaited original contribution to the study of abductive reasoning, providing logical foundations and a rich sample of pertinent applications. Divided into three parts on the conceptual framework, the logical foundations, and the applications, this monograph takes the reader for a comprehensive and erudite tour through the taxonomy of abductive reasoning, via the logical workings of abductive inference ending with applications pertinent to scientific explanation, empirical progress, pragmatism and belief revision.
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  • Multi-dimensional modal logic.Maarten Marx - 1996 - Boston, Mass.: Kluwer Academic Publishers. Edited by Yde Venema.
    Over the last twenty years, in all of these neighbouring fields, modal systems have been developed that we call multi-dimensional. (Our definition of multi ...
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