The Epsilon Calculus

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In Ed Zalta, Stanford Encyclopedia of Philosophy. Stanford, CA: Stanford Encyclopedia of Philosophy (2012)
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Abstract

The epsilon calculus is a logical formalism developed by David Hilbert in the service of his program in the foundations of mathematics. The epsilon operator is a term-forming operator which replaces quantifiers in ordinary predicate logic. Specifically, in the calculus, a term εx A denotes some x satisfying A(x), if there is one. In Hilbert's Program, the epsilon terms play the role of ideal elements; the aim of Hilbert's finitistic consistency proofs is to give a procedure which removes such terms from a formal proof. The procedures by which this is to be carried out are based on Hilbert's epsilon substitution method. The epsilon calculus, however, has applications in other contexts as well. The first general application of the epsilon calculus was in Hilbert's epsilon theorems, which in turn provide the basis for the first correct proof of Herbrand's theorem. More recently, variants of the epsilon operator have been applied in linguistics and linguistic philosophy to deal with anaphoric pronouns.

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Author Profiles

Richard Zach
University of Calgary
Jeremy Avigad
Carnegie Mellon University

Citations of this work

Abstract objects.Gideon Rosen - 2008 - Stanford Encyclopedia of Philosophy.
Witnesses.Matthew Mandelkern - 2022 - Linguistics and Philosophy 45 (5):1091-1117.

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References found in this work

Mathematical logic and Hilbert's & symbol.A. C. Leisenring - 1969 - London,: Macdonald Technical & Scientific.
A Survey of Mathematical Logic.Hao Wang - 1962 - Amsterdam: North-Holland Publishing Company.
Epsilon substitution method for ID1.Toshiyasu Arai - 2003 - Annals of Pure and Applied Logic 121 (2):163-208.

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