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Full Description
This book provides a survey of a number of the major issues in the philosophy of mathematics, such as ontological questions regarding the nature of mathematical objects, epistemic questions about the acquisition of mathematical knowledge, and the intriguing riddle of the applicability of mathematics to the physical world. Some of these issues go back to the nascent years of mathematics itself, others are just beginning to draw the attention of scholars. In addressing these questions, some of the papers in this volume wrestle with them directly, while others use the writings of philosophers such as Hume and Wittgenstein to approach their problems by way of interpretation and critique. The contributors include prominent philosophers of science and mathematics as well as promising younger scholars. The volume seeks to share the concerns of philosophers of mathematics with a wider audience and will be of interest to historians, mathematicians and philosophers alike.
Contents
Preface.- Chapter 1. Introduction.- Chapter 2. Purity and Explanation: Essentially Linked?.- Chapter 3. Rules, Conventions, and Regularities.- Chapter 4. On Mathematical Explanation.- Chapter 5. Steiner's Wittgenstein.- Chapter 6. Logic Discovered and Imposed.- Chapter 7. Mathematical Analogies and Applicability in Physics.- Chapter 8. Learning Cardinals and Ordinals.- Chapter 9. Buck Stopping and Identification of Numbers.- Chapter 10. Platonism and the Proto-Ontology of Mathematics.- Chapter 11. Potential infinity, Mathematical Explanation and de re Reference to Mathematical Objects.- Chapter 12. Mathematics and Physical Discovery.- Chapter 13. Observer Dependent Naturalism.- Chapter 14. David Hume's Treatise View of Geometry.- Index.
