Paul Benacerraf, Hilary Putnam
Philosophy of Mathematics
Selected Readings
Herausgeber: Benacerraf, Hilary
Paul Benacerraf, Hilary Putnam
Philosophy of Mathematics
Selected Readings
Herausgeber: Benacerraf, Hilary
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The present collection brings together in a convenient form the seminal articles in the philosophy of mathematics by these and other major thinkers. It is a substantially revised version of the edition first published in 1964 and includes a revised bibliography. The volume will be welcomed as a major work of reference at this level in the field.
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The present collection brings together in a convenient form the seminal articles in the philosophy of mathematics by these and other major thinkers. It is a substantially revised version of the edition first published in 1964 and includes a revised bibliography. The volume will be welcomed as a major work of reference at this level in the field.
Produktdetails
- Produktdetails
- Verlag: Cambridge University Press
- 2 Revised edition
- Seitenzahl: 612
- Erscheinungstermin: 8. Oktober 2004
- Englisch
- Abmessung: 229mm x 152mm x 36mm
- Gewicht: 914g
- ISBN-13: 9780521296489
- ISBN-10: 052129648X
- Artikelnr.: 21893114
- Verlag: Cambridge University Press
- 2 Revised edition
- Seitenzahl: 612
- Erscheinungstermin: 8. Oktober 2004
- Englisch
- Abmessung: 229mm x 152mm x 36mm
- Gewicht: 914g
- ISBN-13: 9780521296489
- ISBN-10: 052129648X
- Artikelnr.: 21893114
Preface to the second edition
Introduction
Part I. The Foundations of Mathematics: 1. The logicist foundations of mathematics Rudolf Carnap
2. The intuitionist foundations of mathematics Arend Heyting
3. The formalist foundations of mathematics Johann von Neumann
4. Disputation Arend Heyting
5. Intuitionism and formalism L. E. J. Brouwer
6. Consciousness, philosophy, and mathematics L. E. J. Brouwer
7. The philosophical basis of intuitionistic logic Michael Dummett
8. The concept of number Gottlob Frege
9. Selections from Introduction to Mathematical Philosophy Bertrand Russell
10. On the infinite David Hilbert
11. Remarks on the definition and nature of mathematics Haskell B. Curry
12. Hilbert's programme Georg Kreisel
Part II. The Existence of Mathematical Objects: 13. Empiricism, semantics, and ontology Rudolf Carnap
14. On Platonism in mathematics Paul Bernays
15. What numbers could not be Paul Benacerraf
16. Mathematics without foundations Hilary Putnam
Part III. Mathematical Truth: 17. The a priori Alfred Jules Ayer
18. Truth by convention W. V. Quine
19. On the nature of mathematical truth Carl G. Hempel
20. On the nature of mathematical reasoning Henri Poincaré
21. Mathematical truth Paul Benacerraf
22. Models and reality Hilary Putnam
Part IV. The Concept of Set: 23. Russell's mathematical logic Kurt Gödel
24. What in Cantor's continuum problem? Kurt Gödel
25. The iterative concept of set George Boolos
26. The concept of set Hao Wang
Bibliography.
Introduction
Part I. The Foundations of Mathematics: 1. The logicist foundations of mathematics Rudolf Carnap
2. The intuitionist foundations of mathematics Arend Heyting
3. The formalist foundations of mathematics Johann von Neumann
4. Disputation Arend Heyting
5. Intuitionism and formalism L. E. J. Brouwer
6. Consciousness, philosophy, and mathematics L. E. J. Brouwer
7. The philosophical basis of intuitionistic logic Michael Dummett
8. The concept of number Gottlob Frege
9. Selections from Introduction to Mathematical Philosophy Bertrand Russell
10. On the infinite David Hilbert
11. Remarks on the definition and nature of mathematics Haskell B. Curry
12. Hilbert's programme Georg Kreisel
Part II. The Existence of Mathematical Objects: 13. Empiricism, semantics, and ontology Rudolf Carnap
14. On Platonism in mathematics Paul Bernays
15. What numbers could not be Paul Benacerraf
16. Mathematics without foundations Hilary Putnam
Part III. Mathematical Truth: 17. The a priori Alfred Jules Ayer
18. Truth by convention W. V. Quine
19. On the nature of mathematical truth Carl G. Hempel
20. On the nature of mathematical reasoning Henri Poincaré
21. Mathematical truth Paul Benacerraf
22. Models and reality Hilary Putnam
Part IV. The Concept of Set: 23. Russell's mathematical logic Kurt Gödel
24. What in Cantor's continuum problem? Kurt Gödel
25. The iterative concept of set George Boolos
26. The concept of set Hao Wang
Bibliography.
Preface to the second edition
Introduction
Part I. The Foundations of Mathematics: 1. The logicist foundations of mathematics Rudolf Carnap
2. The intuitionist foundations of mathematics Arend Heyting
3. The formalist foundations of mathematics Johann von Neumann
4. Disputation Arend Heyting
5. Intuitionism and formalism L. E. J. Brouwer
6. Consciousness, philosophy, and mathematics L. E. J. Brouwer
7. The philosophical basis of intuitionistic logic Michael Dummett
8. The concept of number Gottlob Frege
9. Selections from Introduction to Mathematical Philosophy Bertrand Russell
10. On the infinite David Hilbert
11. Remarks on the definition and nature of mathematics Haskell B. Curry
12. Hilbert's programme Georg Kreisel
Part II. The Existence of Mathematical Objects: 13. Empiricism, semantics, and ontology Rudolf Carnap
14. On Platonism in mathematics Paul Bernays
15. What numbers could not be Paul Benacerraf
16. Mathematics without foundations Hilary Putnam
Part III. Mathematical Truth: 17. The a priori Alfred Jules Ayer
18. Truth by convention W. V. Quine
19. On the nature of mathematical truth Carl G. Hempel
20. On the nature of mathematical reasoning Henri Poincaré
21. Mathematical truth Paul Benacerraf
22. Models and reality Hilary Putnam
Part IV. The Concept of Set: 23. Russell's mathematical logic Kurt Gödel
24. What in Cantor's continuum problem? Kurt Gödel
25. The iterative concept of set George Boolos
26. The concept of set Hao Wang
Bibliography.
Introduction
Part I. The Foundations of Mathematics: 1. The logicist foundations of mathematics Rudolf Carnap
2. The intuitionist foundations of mathematics Arend Heyting
3. The formalist foundations of mathematics Johann von Neumann
4. Disputation Arend Heyting
5. Intuitionism and formalism L. E. J. Brouwer
6. Consciousness, philosophy, and mathematics L. E. J. Brouwer
7. The philosophical basis of intuitionistic logic Michael Dummett
8. The concept of number Gottlob Frege
9. Selections from Introduction to Mathematical Philosophy Bertrand Russell
10. On the infinite David Hilbert
11. Remarks on the definition and nature of mathematics Haskell B. Curry
12. Hilbert's programme Georg Kreisel
Part II. The Existence of Mathematical Objects: 13. Empiricism, semantics, and ontology Rudolf Carnap
14. On Platonism in mathematics Paul Bernays
15. What numbers could not be Paul Benacerraf
16. Mathematics without foundations Hilary Putnam
Part III. Mathematical Truth: 17. The a priori Alfred Jules Ayer
18. Truth by convention W. V. Quine
19. On the nature of mathematical truth Carl G. Hempel
20. On the nature of mathematical reasoning Henri Poincaré
21. Mathematical truth Paul Benacerraf
22. Models and reality Hilary Putnam
Part IV. The Concept of Set: 23. Russell's mathematical logic Kurt Gödel
24. What in Cantor's continuum problem? Kurt Gödel
25. The iterative concept of set George Boolos
26. The concept of set Hao Wang
Bibliography.