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(2003) Synthese 137 (1-2).
Even though Husserl and Brouwer have never discussed each other's work, ideas from Husserl have been used to justify Brouwer's intuitionistic logic. I claim that a Husserlian reading of Brouwer can also serve to justify the existence of choice sequences as objects of pure mathematics. An outline of such a reading is given, and some objections are discussed.
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Van Atten, M. (2003). Brouwer, as never read by Husserl. Synthese 137 (1-2), pp. 3-19.
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