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|a 2001018136
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|a 510.1
|2 21
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|a Philosophy of mathematics :
|b an anthology /
|c edited by Dale Jacquette.
|
264 |
|
1 |
|a Malden, Mass. :
|b Blackwell Publishers,
|c 2002.
|
300 |
|
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|a xii, 428 pages :
|b illustrations ;
|c 26 cm.
|
336 |
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|a text
|b txt
|2 rdacontent
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|a unmediated
|b n
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|a volume
|b nc
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|a Blackwell philosophy anthologies ;
|v 15
|
504 |
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|a Includes bibliographical references and index.
|
505 |
2 |
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|t Introduction: Mathematics and Philosophy of Mathematics /
|r Dale Jacquette --
|g Pt. I.
|t The Realm of Mathematics.
|g 1.
|t What is Mathematics About? /
|r Michael Dummett.
|g 2.
|t Mathematical Explanation /
|r Mark Steiner.
|g 3.
|t Frege versus Cantor and Dedekind: On the Concept of Number /
|r William W. Tait.
|g 4.
|t The Present Situation in the Philosophy of Mathematics /
|r Henry Mehlberg --
|g Pt. II.
|t Ontology of Mathematics and the Nature and Knowledge of Mathematical Truth.
|g 5.
|t What Numbers Are /
|r N. P. White.
|g 6.
|t Mathematical Truth /
|r Paul Benacerraf.
|g 7.
|t Ontology and Mathematical Truth /
|r Michael Jubien.
|g 8.
|t An Anti-realist Account of Mathematical Truth /
|r Graham Priest.
|g 9.
|t What Mathematical Knowledge Could Be /
|r Jerrold J. Katz.
|g 10.
|t The Philosophical Basis of Our Knowledge of Number /
|r William Demopoulos --
|g Pt. III.
|t Models and Methods of Mathematical Proof.
|g 11.
|t Mathematical Proof /
|r G. H. Hardy.
|g 12.
|t What Does a Mathematical Proof Prove? /
|r Imre Lakatos.
|g 13.
|t The Four-Color Problem /
|r Kenneth Appel and Wolfgang Haken.
|g 14.
|t Knowledge of Proofs /
|r Peter Pagin.
|g 15.
|t The Phenomenology of Mathematical Proof /
|r Gian-Carlo Rota.
|g 16.
|t Mechanical Procedures and Mathematical Experience /
|r Wilfried Sieg --
|g Pt. IV.
|t Intuitionism.
|g 17.
|t Intuitionism and Formalism /
|r L. E. J. Brouwer.
|g 18.
|t Mathematical Intuition /
|r Charles Parsons.
|g 19.
|t Brouwerian Intuitionism /
|r Michael Detlefsen.
|g 20.
|t A Problem of Intuitionism: The Apparent Possibility of Performing Infinitely Many Takes in a Finite Time /
|r A. W. Moore.
|g 21.
|t A Pragmatic Analysis of Mathematical Realism and Intuitionism /
|r Michel J. Blais --
|g Pt. V.
|t Philosophical Foundations of Set Theory.
|g 22.
|t Sets and Numbers /
|r Penelope Maddy.
|g 23.
|t Sets, Aggregates, and Numbers /
|r Palle Yourgrau.
|g 24.
|t The Approaches to Set Theory /
|r John Lake.
|g 25.
|t Where Do Sets Come From? /
|r Harold T. Hodes.
|g 26.
|t Conceptual Schemes in Set Theory /
|r Robert McNaughton.
|g 27.
|t What is Required of a Foundation for Mathematics? /
|r John Mayberry.
|
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|x Philosophy
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|a Jacquette, Dale,
|e editor.
|9 1033913
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830 |
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|a Blackwell philosophy anthologies ;
|v 15.
|9 1033839
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