- Objective Knowledge.K. R. Popper - 1972 - Journal for General Philosophy of Science / Zeitschrift für Allgemeine Wissenschaftstheorie 4 (2):388-398.details
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Where Mathematics Comes From How the Embodied Mind Brings Mathematics Into Being.George Lakoff & Rafael E. Núñez - 2000details
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The Structure of Science.Ernest Nagel - 1961 - Les Etudes Philosophiques 17 (2):275-275.details
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Formalism.Michael Detlefsen - 2005 - In Stewart Shapiro (ed.), Oxford Handbook of Philosophy of Mathematics and Logic. Oxford and New York: Oxford University Press. pp. 236--317.details
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What is Mathematical Truth?Hilary Putnam - 1979 - In Philosophical Papers: Volume 1, Mathematics, Matter and Method. New York: Cambridge University Press. pp. 60--78.details
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The unreasonable effectiveness of mathematics in the natural sciences.Eugene Wigner - 1960 - Communications in Pure and Applied Mathematics 13:1-14.details
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What is Mathematics, Really?Reuben Hersh - 1997 - New York: Oxford University Press.details
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The role of diagrams in mathematical arguments.David Sherry - 2008 - Foundations of Science 14 (1-2):59-74.details
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Main problems of diagrammatic reasoning. Part I: The generalization problem. [REVIEW]Zenon Kulpa - 2009 - Foundations of Science 14 (1-2):75-96.details
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Explanation, independence and realism in mathematics.Michael D. Resnik & David Kushner - 1987 - British Journal for the Philosophy of Science 38 (2):141-158.details
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Mathematics without foundations.Hilary Putnam - 1967 - Journal of Philosophy 64 (1):5-22.details
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Mathematical proof.G. H. Hardy - 1929 - Mind 38 (149):1-25.details
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A System of Logic, Ratiocinative and Inductive: Being a Connected View of the Principles of Evidence, and the Methods of Scientific Investigation.John Stuart Mill (ed.) - 1843 - London, England: Cambridge University Press.details
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Georg Cantor: His Mathematics and Philosophy of the Infinite.Joseph Warren Dauben - 1979 - Hup.details
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New Essays on Human Understanding.G. W. Leibniz - 1981 - Tijdschrift Voor Filosofie 45 (3):489-490.details
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Penrose and platonism.Mark Steiner - 2000 - In Emily Grosholz & Herbert Breger (eds.), The growth of mathematical knowledge. Boston: Kluwer Academic Publishers. pp. 133--141.details
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Philosophy of mathematics and mathematical practice in the seventeenth century.Paolo Mancosu (ed.) - 1996 - New York: Oxford University Press.details
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Logicism revisited.Alan Musgrave - 1977 - British Journal for the Philosophy of Science 28 (2):99-127.details
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The foundations of science.Henri Poincaré - 1913 - New York and Garrison, N.Y.,: The Science press. Edited by George Bruce Halsted.details
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Collected papers.Charles S. Peirce - 1931 - Cambridge,: Belknap Press of Harvard University Press.details
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Georg Cantor, His Mathematics and Philosophy of the Infinite.J. W. Dauben - 1993 - Revue Philosophique de la France Et de l'Etranger 183 (3):622-625.details
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Computability. Computable Functions, Logic, and the Foundations of Mathematics.Richard L. Epstein & Walter A. Carnielli - 2002 - Bulletin of Symbolic Logic 8 (1):101-104.details
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Elementary logic of science and mathematics.P. H. Nidditch - 1960 - Glencoe, Ill.,: Free Press.details
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[Omnibus Review]. [REVIEW]Don Fallis - 1998 - Journal of Symbolic Logic 63 (3):1196-1200.details
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The Nature of Mathematical Proof.R. L. Wilder - 1944 - Journal of Symbolic Logic 9 (3):73-73.details
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Later Empiricism and Logical Positivism.John Skorupski - 2005 - In Stewart Shapiro (ed.), Oxford Handbook of Philosophy of Mathematics and Logic. Oxford and New York: Oxford University Press. pp. 29--4.details
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Bolzano's ideal of algebraic analysis.Philip Kitcher - 1975 - Studies in History and Philosophy of Science Part A 6 (3):229-269.details
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Tacit knowledge and mathematical progress.Herbert Breger - 2000 - In Emily Grosholz & Herbert Breger (eds.), The growth of mathematical knowledge. Boston: Kluwer Academic Publishers. pp. 221--230.details
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The metaphysical basis of logic.R. L. Epstein - 1999 - Manuscrito 22 (2):133-148.details
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Geometry: The first universal language of mathematics.I. G. Bashmakova & G. S. Smirnova - 2000 - In Emily Grosholz & Herbert Breger (eds.), The growth of mathematical knowledge. Boston: Kluwer Academic Publishers. pp. 331--340.details
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