Between Logic and Intuition
Essays in Honor of Charles Parsons
Herausgeber: Sher, Gila; Tieszen, Richard
Between Logic and Intuition
Essays in Honor of Charles Parsons
Herausgeber: Sher, Gila; Tieszen, Richard
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Offers a conspectus of major trends in the philosophy of logic and mathematics.
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Produktdetails
- Produktdetails
- Verlag: Cambridge University Press
- Seitenzahl: 352
- Erscheinungstermin: 9. August 2010
- Englisch
- Abmessung: 235mm x 157mm x 25mm
- Gewicht: 724g
- ISBN-13: 9780521650762
- ISBN-10: 0521650763
- Artikelnr.: 21801957
- Verlag: Cambridge University Press
- Seitenzahl: 352
- Erscheinungstermin: 9. August 2010
- Englisch
- Abmessung: 235mm x 157mm x 25mm
- Gewicht: 724g
- ISBN-13: 9780521650762
- ISBN-10: 0521650763
- Artikelnr.: 21801957
Preface
Part I. Logic: 1. Paradox revisited I: truth
2. Paradox revisited II: sets - a case of all or none? Hilary Putnam
3. Truthlike and truthful operators Arnold Koslow
4. 'Everything' Vann McGee
5. On second-order logic and natural language James Higginbotham
6. The logical roots of indeterminacy Gila Sher
7. The logic of full belief Isaac Levi
Part II. Intuition: 8. Immediacy and the birth of reference in Kant: the case for space Carl J. Posy
9. Geometry, construction and intuition in Kant and his successors Michael Friedman
10. Parsons on mathematical intuition and obviousness Michael D. Resnik
11. Gödel and Quine on meaning and mathematics Richard Tieszen
Part III. Numbers, Sets and Classes: 12. Must we believe in set theory? George Boolos
13. Cantor's Grundlagen and the paradoxes of set theory W. W. Tait
14. Frege, the natural numbers and natural kinds Mark Steiner
15. A theory of sets and classes Penelope Maddy
16. Challenges to predictive foundations of arithmetic Solomon Feferman and Geoffrey Hellman
Name index.
Part I. Logic: 1. Paradox revisited I: truth
2. Paradox revisited II: sets - a case of all or none? Hilary Putnam
3. Truthlike and truthful operators Arnold Koslow
4. 'Everything' Vann McGee
5. On second-order logic and natural language James Higginbotham
6. The logical roots of indeterminacy Gila Sher
7. The logic of full belief Isaac Levi
Part II. Intuition: 8. Immediacy and the birth of reference in Kant: the case for space Carl J. Posy
9. Geometry, construction and intuition in Kant and his successors Michael Friedman
10. Parsons on mathematical intuition and obviousness Michael D. Resnik
11. Gödel and Quine on meaning and mathematics Richard Tieszen
Part III. Numbers, Sets and Classes: 12. Must we believe in set theory? George Boolos
13. Cantor's Grundlagen and the paradoxes of set theory W. W. Tait
14. Frege, the natural numbers and natural kinds Mark Steiner
15. A theory of sets and classes Penelope Maddy
16. Challenges to predictive foundations of arithmetic Solomon Feferman and Geoffrey Hellman
Name index.
Preface
Part I. Logic: 1. Paradox revisited I: truth
2. Paradox revisited II: sets - a case of all or none? Hilary Putnam
3. Truthlike and truthful operators Arnold Koslow
4. 'Everything' Vann McGee
5. On second-order logic and natural language James Higginbotham
6. The logical roots of indeterminacy Gila Sher
7. The logic of full belief Isaac Levi
Part II. Intuition: 8. Immediacy and the birth of reference in Kant: the case for space Carl J. Posy
9. Geometry, construction and intuition in Kant and his successors Michael Friedman
10. Parsons on mathematical intuition and obviousness Michael D. Resnik
11. Gödel and Quine on meaning and mathematics Richard Tieszen
Part III. Numbers, Sets and Classes: 12. Must we believe in set theory? George Boolos
13. Cantor's Grundlagen and the paradoxes of set theory W. W. Tait
14. Frege, the natural numbers and natural kinds Mark Steiner
15. A theory of sets and classes Penelope Maddy
16. Challenges to predictive foundations of arithmetic Solomon Feferman and Geoffrey Hellman
Name index.
Part I. Logic: 1. Paradox revisited I: truth
2. Paradox revisited II: sets - a case of all or none? Hilary Putnam
3. Truthlike and truthful operators Arnold Koslow
4. 'Everything' Vann McGee
5. On second-order logic and natural language James Higginbotham
6. The logical roots of indeterminacy Gila Sher
7. The logic of full belief Isaac Levi
Part II. Intuition: 8. Immediacy and the birth of reference in Kant: the case for space Carl J. Posy
9. Geometry, construction and intuition in Kant and his successors Michael Friedman
10. Parsons on mathematical intuition and obviousness Michael D. Resnik
11. Gödel and Quine on meaning and mathematics Richard Tieszen
Part III. Numbers, Sets and Classes: 12. Must we believe in set theory? George Boolos
13. Cantor's Grundlagen and the paradoxes of set theory W. W. Tait
14. Frege, the natural numbers and natural kinds Mark Steiner
15. A theory of sets and classes Penelope Maddy
16. Challenges to predictive foundations of arithmetic Solomon Feferman and Geoffrey Hellman
Name index.