Natural logicism via the logic of orderly pairing

Abstract

The aim here is to describe how to complete the constructive logicist program, in the author’s book Anti-Realism and Logic, of deriving all the Peano-Dedekind postulates for arithmetic within a theory of natural numbers that also accounts for their applicability in counting finite collections of objects. The axioms still to be derived are those for addition and multiplication. Frege did not derive them in a fully explicit, conceptually illuminating way. Nor has any neo-Fregean done so.

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Neil Tennant
Ohio State University

Citations of this work

Logicism and Neologicism.Neil Tennant - 2013 - Stanford Encyclopedia of Philosophy.
Tuples all the Way Down?Simon Thomas Hewitt - 2018 - Thought: A Journal of Philosophy 7 (3):161-169.

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