12 found
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  1.  57
    The Reality of Mathematics and the Case of Set Theory.Daniel Isaacson - 2010 - In Zsolt Novák & András Simonyi (eds.), Truth, reference, and realism. New York: Central European University Press. pp. 1-76.
  2.  16
    Proofs and Refutations: The Logic of Mathematical Discovery.Daniel Isaacson - 1978 - Philosophical Quarterly 28 (111):169-171.
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  3. Some considerations on arithmetical truth and the co-rule.Daniel Isaacson - 1992 - In Michael Detlefsen (ed.), Proof, Logic and Formalization. London, England: Routledge. pp. 94.
     
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  4. Quine and logical positivism.Daniel Isaacson - 2006 - In Roger F. Gibson (ed.), The Cambridge Companion to Quine. New York: Cambridge University Press. pp. 214--269.
  5. Mathematical intuition and objectivity.Daniel Isaacson - 1994 - In Alexander George (ed.), Mathematics and Mind. Oxford University Press. pp. 118--140.
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  6.  75
    Carnap, Quine, and Logical Truth.Daniel Isaacson - 2000 - In Dagfinn Føllesdal (ed.), Philosophy of Quine. Garland. pp. 360--391.
  7. Arithmetical truth and hidden higher-order concepts.Daniel Isaacson - 1987 - In Logic Colloquium '85: Proceedings of the Colloquium held in Orsay, France July 1985 (Studies in Logic and the Foundations of Mathematics, Vol. 122.). Amsterdam, New York, Oxford, Tokyo: North-Holland. pp. 147-169.
    The incompleteness of formal systems for arithmetic has been a recognized fact of mathematics. The term “incompleteness” suggests that the formal system in question fails to offer a deduction which it ought to. This chapter focuses on the status of a formal system, Peano Arithmetic, and explores a viewpoint on which Peano Arithmetic occupies an intrinsic, conceptually well-defined region of arithmetical truth. The idea is that it consists of those truths which can be perceived directly from the purely arithmetical content (...)
     
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  8.  23
    Brno, Czech Republic, August 25–29, 1996.G. F. R. Ellis, Solomon Feferman, Daniel Isaacson, Boris A. Kushner, Petr Hájek & Jirı Zlatuška - 1996 - Bulletin of Symbolic Logic 2 (4):473-473.
  9.  16
    Hersh Reuben. Some proposals for reviving the philosophy of mathematics. Advances in mathematics, vol. 31 , pp. 31–50.Daniel Isaacson - 1983 - Journal of Symbolic Logic 48 (3):871-872.
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  10. Logic Colloquium '85: Proceedings of the Colloquium held in Orsay, France July 1985 (Studies in Logic and the Foundations of Mathematics, Vol. 122.).Daniel Isaacson (ed.) - 1987 - Amsterdam, New York, Oxford, Tokyo: North-Holland.
     
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  11.  9
    Michael Anthony Eardley Dummett: A Biographical Sketch.Daniel Isaacson - 2017 - In Michael Frauchiger (ed.), Truth, Meaning, Justification, and Reality: Themes From Dummett. Boston: De Gruyter. pp. 1-12.
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  12.  9
    Review: Reuben Hersh, Some Proposals for Reviving the Philosophy of Mathematics. [REVIEW]Daniel Isaacson - 1983 - Journal of Symbolic Logic 48 (3):871-872.
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