Dissertation, The Graduate Center, City University of New York (
2024)
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Abstract
In this Dissertation, we examine a handful of related themes in the philosophy of logic
and mathematics. We take as a starting point the deeply philosophical, and—as we argue,
deeply Kantian—views of L.E.J. Brouwer, the founder of intuitionism. We examine his
famous first act of intuitionism. Therein, he put forth both a critical and a constructive
idea. This critical idea involved digging a philosophical rift between what he thought of
himself as doing and what he thought of his contemporaries, specifically Hilbert, as doing.
He sought to completely separate mathematics from mathematical language, and thereby
logic. In chapter 3, we examine the philosophical foundations for this separation. Artemov
Artemov (2001) articulates what we might think of as constructive propositional reasoning
in a formal system that augments classical propositional logic with a theory of proofs. In
doing this, instead of using just one type of object to characterize constructive reasoning,
he uses two; propositions and proofs. In chapter 4, we explore the extent to which it might
make sense to think of classical propositional reasoning as instead a theory that has two
types of objects in the Artemov style. In chapters 5 and 6, we examine two specific case
studies; we look at two philosophical phenomena that admit of formal characterizations and
then propose those. In both cases, we focus on predicate style treatments of modality.