Kurt Godel and phenomenology

Philosophy of Science 59 (2):176-194 (1992)
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Abstract

Godel began to seriously study Husserl's phenomenology in 1959, and the Godel Nachlass is known to contain many notes on Husserl. In this paper I describe what is presently known about Godel's interest in phenomenology. Among other things, it appears that the 1963 supplement to "What is Cantor's Continuum Hypothesis?", which contains Godel's famous views on mathematical intuition, may have been influenced by Husserl. I then show how Godel's views on mathematical intuition and objectivity can be readily interpreted in a phenomenological theory of intuition and mathematical knowledge

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10.1086/289661

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Citations of this work

Plato's Problem: An Introduction to Mathematical Platonism.Marco Panza & Andrea Sereni - 2013 - New York: Palgrave-Macmillan. Edited by Andrea Sereni & Marco Panza.
Gödel And The Intuition Of Concepts.Richard Tieszen - 2002 - Synthese 133 (3):363-391.
Gödel and the intuition of concepts.Richard Tieszen - 2002 - Synthese 133 (3):363 - 391.
Is Cantor's continuum problem inherently vague?Kai Hauser - 2002 - Philosophia Mathematica 10 (3):257-285.

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References found in this work

Philosophy of mathematics, selected readings.Paul Benacerraf & Hilary Putnam - 1966 - Revue Philosophique de la France Et de l'Etranger 156:501-502.
From Mathematics to Philosophy.Hao Wang - 1975 - British Journal for the Philosophy of Science 26 (2):170-174.
Perception and mathematical intuition.Penelope Maddy - 1980 - Philosophical Review 89 (2):163-196.

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