Access the full text.
Sign up today, get DeepDyve free for 14 days.
References for this paper are not available at this time. We will be adding them shortly, thank you for your patience.
Books of Essays 151 Carlo H. S´ equin and Raymond Shiau, Rendering Pacioli’s rhombicuboctahe- dron, pp. 106–120 + colour plates. Jeremy Gray, Who would have won the Fields Medal 150 years ago?, pp. 121–129. Noson S. Yanofsky, Paradoxes, contradicitons, and the limis of science, pp. 130–144. Jean-Pierre Marquis, Stairway to heaven: The abstract method and levels of abstraction in mathematics, pp. 145–171. Robert Bain, Are our brains Bayesian?, pp. 172–181. Graham Southorn, Great expectations: The past, present, and future of prediction, pp. 182–192. Mircea Pitici, Notable writings, pp. 199–219. 10.1093/philmat/nky001 Advance Access Publication on January 18, 2018 S´ ebastien Gandon and Ivahn Smadja, eds. Philosophie de Math´ e- matiques: Ontologie, V´ erit´ e et Fondements. Textes cl´ es. Ivahn Smadja, Anne-Marie Boivert, S´ ebastien Gandon, Brice Halimi, S´ ebastien Maronne, and Benoiˆ ıt Timmermans, trans. Paris: Vrin, 2014. ISBN 978-2-7116-2478-2 (hbk). Pp. 360. AUTHORS AND TITLES S. Gandon and I. Smadja, Introduction, pp. 7–29. Partie 1: Les dilemmes de Benacerraf S´ ebastien Gandon and Ivahn Smadja, Pr´ esentation, pp. 33–44. P. Benacerraf, Ce que les nombres ne peuvent pas ˆ etre, pp. 45–73. P. Benacerraf, La v´ erit´ e math´ ematique, pp. 75–96. Partie 2: R´ ealismes, Nominalismes et arguments d’indispensabilit´ e S´ ebastien Gandon and Ivahn Smadja, Pr´ esentation, pp. 99–116. H. Putnam, Qu’est-ce que la v´ erit´ e math´ ematique (extrait), pp. 117–127. H. Putnam, Philosophie de la logique (extrait), pp. 129–137. H. Field, Pour une science sans nombres (extrait), pp. 139–168. M. Steiner, L’application des math´ ematiques aux sciences de la nature, pp. 169–201. Partie 3: Fondationalismes revisit´ es: logicisme, intuitionisme et formalisme S´ ebastien Gandon and Ivahn Smadja, Pr´ esentation, pp. 205–239. R.G. Heck, Jr, Introduction au th´ eor` eme de Frege, pp. 241–280. M. Detelfsen, L’intuitionisme de Brouwer, pp. 281–326. Bibliographie g´ en´ erale, pp. 327–345. 10.1093/philmat/nkx037 Advance Access publication on December 21, 2017 Downloaded from https://academic.oup.com/philmat/article-abstract/26/1/151/4769395 by Ed 'DeepDyve' Gillespie user on 16 March 2018
Philosophia Mathematica – Oxford University Press
Published: Feb 1, 2018
You can share this free article with as many people as you like with the url below! We hope you enjoy this feature!
Read and print from thousands of top scholarly journals.
Already have an account? Log in
Bookmark this article. You can see your Bookmarks on your DeepDyve Library.
To save an article, log in first, or sign up for a DeepDyve account if you don’t already have one.
Copy and paste the desired citation format or use the link below to download a file formatted for EndNote
Access the full text.
Sign up today, get DeepDyve free for 14 days.
All DeepDyve websites use cookies to improve your online experience. They were placed on your computer when you launched this website. You can change your cookie settings through your browser.