Abstract
In What is Mathematics, Really? I argued, following Leslie White, that mathematical entities are real objects and that they are part of culture, i.e., sociocultural entities and intersubjective.
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References
Antonio Damasio, 2003, Looking for Spinoza : Joy, Sorrow, and the Feeling Brain, Harcourt 2012, Self Comes to Mind : Constructing the Conscious Brain, Random House
Stanislas Dehaene, 2014, Consciousness and the Brain, Penguin Books, New York
Michele Friend, 2013, Pluralism in Mathematics: A New Position in Philosophy of Mathematics, Springer
Reuben Hersh, 2014, Experiencing Mathematics, American Mathematical Society, pp. 47–115
Robert Sokolowski, 2000, Introduction to Phenomenology, Cambridge University Press
Leslie White, “The Locus of Mathematical Reality, An Anthropological Footnote,” in R. Hersh, 2006, 18 Unconventional Essays on the Nature of Mathematics, pp. 304–319, Springer. First published in Philosophy of Science, October 1947.
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Hersh, R. (2017). On the Nature of Mathematical Entities. In: Sriraman, B. (eds) Humanizing Mathematics and its Philosophy. Birkhäuser, Cham. https://doi.org/10.1007/978-3-319-61231-7_27
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DOI: https://doi.org/10.1007/978-3-319-61231-7_27
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