Abstract

The present dissertation includes three chapters: chapter one 'Challenges to platonism'; chapter two 'counterparts of non-mathematical statements'; chapter three 'Nominalizing platonistic accounts of the predictive success of mathematics'. The purpose of the dissertation is to articulate a fundamental problem in the philosophy of mathematics and explore certain solutions to this problem. The central problematic is that platonistic mathematics is involved in the explanation and prediction of physical phenomena and hence its role in such explanations gives us good reason to believe that platonism is true. On the other hand, we have grounds, essentially epistemological, for avoiding the use of platonistic mathematics. ;This philosophical tension can be relieved only by showing that good non-platonistic explanations of physical phenomena are available or by showing that the epistemological objections to platonism may be overcome. While both options are discussed in some detail, a certain emphasis is placed on the task of fashioning non-platonistic accounts of physical phenomena to replace the usual platonistic accounts. As is suggested in chapter one, the reason for this emphasis is that the referential and more broadly epistemological objections to platonism seem quite convincing. Of paramount interest in regards to an inquiry into the utility of mathematics is the status of biconditional statements connecting non-mathematical statements with their mathematical counterparts. ;In chapters two and three of the dissertation I address certain key philosophical issues surrounding the status of these biconditionals. The upshot of these chapters is that these biconditionals can be used to illuminate the utility of mathematics; and there is good reason to think an account of the utility of mathematics can be given without acknowledging the truth of mathematics