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Beyond first-order logic: the historical interplay between mathematical logic and axiomatic set theory
History and Philosophy of Logic 1 (1-2):95-137 (1980)
Abstract
What has been the historical relationship between set theory and logic? On the one hand, Zermelo and other mathematicians developed set theory as a Hilbert-style axiomatic system. On the other hand, set theory influenced logic by suggesting to Schröder, Löwenheim and others the use of infinitely long expressions. The questions of which logic was appropriate for set theory - first-order logic, second-order logic, or an infinitary logic - culminated in a vigorous exchange between Zermelo and Gödel around 1930Links
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Citations of this work
The development of mathematical logic from Russell to Tarski, 1900-1935.Paolo Mancosu, Richard Zach & Calixto Badesa - 2011 - In Leila Haaparanta (ed.), The development of modern logic. New York: Oxford University Press.
Neo-Fregeanism: An Embarrassment of Riches.Alan Weir - 2003 - Notre Dame Journal of Formal Logic 44 (1):13-48.
Completeness and Categoricity. Part I: Nineteenth-century Axiomatics to Twentieth-century Metalogic.Steve Awodey & Erich H. Reck - 2002 - History and Philosophy of Logic 23 (1):1-30.
Second-order languages and mathematical practice.Stewart Shapiro - 1985 - Journal of Symbolic Logic 50 (3):714-742.
The Road to Modern Logic—An Interpretation.José Ferreirós - 2001 - Bulletin of Symbolic Logic 7 (4):441-484.
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