A Generic Russellian Elimination of Abstract Objects

Philosophia Mathematica 25 (1):91-115 (2017)
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Abstract

In this paper I explore a position on which it is possible to eliminate the need for postulating abstract objects through abstraction principles by treating terms for abstracta as ‘incomplete symbols’, using Russell's no-classes theory as a template from which to generalize. I defend views of this stripe against objections, most notably Richard Heck's charge that syntactic forms of nominalism cannot correctly deal with non-first-orderizable quantifcation over apparent abstracta. I further discuss how number theory may be developed in a system treating apparent terms for numbers using these definitions.

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Kevin C. Klement
University of Massachusetts, Amherst

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