Phenomenology and mathematics

During Edmund Husserl's lifetime, modern logic and mathematics rapidly developed toward their current outlook and Husserl's writings can be fruitfully compared and contrasted with both 19th century figures (Boole, Schroeder, Weierstrass) as well as the 20th century characters (Heyting, Zermelo, Goedel). Besides the more historical studies, the internal ones on Husserl alone and the external ones attempting to clarify his role in the more general context of the developing mathematics and logic, Husserl's phenomenology offers also a systematically rich but little researched area of investigation. This volume aims to establish the starting point for the development, evaluation and appraisal of the phenomenology of mathematics. It gathers the contributions of the main scholars of this emerging field into one publication for the first time. Combining both historical and systematic studies from various angles, the volume charts answers to the question "What kind of philosophy of mathematics is phenomenology?"

• R. Tieszen, Mathematical Realism and Transcendental Phenomenological Idealism
• G.E. Rosado Haddock, Platonism, Phenomenology, and Interderivability
• C. Hill, Husserl on Axiomatization and Arithmetic
• D. Lohmar, Intuition in Mathematics. On the function of eidetic variation in mathematical proofs
• J. Hintikka, How Can a Phenomenologist Have a Philosophy of Mathematics? M. Hartimo, Development of Mathematics and the Birth of Phenomenology
• J.J da Silva, Beyond Leibniz: Husserl's Vindication of Symbolic Knowledge
• R. Hanna, Mathematical Truth Regained
• O.K. Wiegand, On Referring to Gestalts.