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Table of Contents
Chapter 1. Introduction
Part I Gödel and Leibniz
Chapter 2 A note on Leibniz?s argument against infinite wholes
Chapter 3. Monads and sets: on Gödel, Leibniz, and the Reflection Principle
Chapter 4. Gödel?s Dialectica Interpretation and Leibniz
Part II Gödel and Husserl
Chapter 5. Phenomenology of mathematics
Chapter 6. On the philosophical development of Kurt Gödel (with Juliette Kennedy)
Chapter 7. Gödel, mathematics, and possible worlds
Chapter 8. Two draft letters from Gödel on self-knowledge of Reason
Part III Gödel and Brouwer
Chapter 9. Gödel and Brouwer: two rivalling brothers
Chapter 10. Mysticism and mathematics: Brouwer, Gödel, and the common core thesis (with Robert Tragesser)
Chapter 11. Gödel and intuitionism
Part IV A partial assessment
Chapter 12. Construction and constitution in mathematics.
Part I Gödel and Leibniz
Chapter 2 A note on Leibniz?s argument against infinite wholes
Chapter 3. Monads and sets: on Gödel, Leibniz, and the Reflection Principle
Chapter 4. Gödel?s Dialectica Interpretation and Leibniz
Part II Gödel and Husserl
Chapter 5. Phenomenology of mathematics
Chapter 6. On the philosophical development of Kurt Gödel (with Juliette Kennedy)
Chapter 7. Gödel, mathematics, and possible worlds
Chapter 8. Two draft letters from Gödel on self-knowledge of Reason
Part III Gödel and Brouwer
Chapter 9. Gödel and Brouwer: two rivalling brothers
Chapter 10. Mysticism and mathematics: Brouwer, Gödel, and the common core thesis (with Robert Tragesser)
Chapter 11. Gödel and intuitionism
Part IV A partial assessment
Chapter 12. Construction and constitution in mathematics.