A potentialist conception of ultrafinitism

Abstract

I shall explore various senses in which ultrafinitism can be fruitfully understood as engaging with a potentialist perspective in mathematics. First, I explain that every model M of the theory of finite arithmetic -- arithmetic with a largest number, in which addition and multiplication are merely partial functions -- is bi-interpretable with a strictly taller model M+, in which the arithmetic operations on objects taken from the original base model M are totally defined in the extended world M+. More generally, I explain how ultrafinitist ideas emerge in the modal potentialist system consisting of all models of arithmetic under end-extension.

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