Gödel '96
Logical Foundations of Mathematics, Computer Science and Physics - Kurt Gödel's Legacy

Table of Contents

Preface
Part I. Invited Papers:
1. Gödel's program for new axioms: why, where, how and what? Solomon Feferman
2. Infinite-valued Gödel logics with 0-1-projections and relativizations Matthias Baaz
3. Contributions of K. Gödel to relativity and cosmology G. F. R. Ellis
4. Kurt Gödel and the constructive mathematics of A. A. Markov Boris A. Kushner
5. Hao Wang as philosopher Charles Parsons
6. A bottom-up approach to foundations of mathematics Pavel Pudlák
7. K-graph machines - generalizing Turing's machines and arguments Wilfried Sieg and John Byrnes
8. Forcing on bounded arithmetic Gaisi Takeuti and Masahiro Yasumoto
9. Uniform interpolation and layered bisimulation Albert Visser
Part II. Contributed Papers:
10. Gödel's ontological proof revisited C. Anthony Anderson and Michael Gettings
11. A uniform theorem proving tableaux method for modal logic Tadashi Araragi
12. Decidability of the \exists*\forall*-class in the membership theory NWL Dorella Bellè and Franco Parlamento
13. A logical approach to complexity bounds for subtype inequalities Marcin Benke
14. How to characterize provably total functions Benjamin Blankertz and Andreas Weiermann
15. Completeness has to be restricted - Gödel's interpretation of the parameter t Giora Hon
16. A bounded arithmetic theory for constant depth threshold circuits Jan Johannsen
17. Information content and computational complexity of recursive sets Lars Kristiansen
18. Kurt Gödel and the consistency of R## Robert K. Meyer
19. Best possible answer is computable for fuzzy SLD-resolution Leonard Paulík
20. The finite stages of inductive definitions Robert F. Stärk
21. Gödel and the theory of everything Michael Stöltzner
22. Replacement ─/→ collection Andrzej M. Zarach.

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• Copyright Information Page (42 KB)
• Marketing Excerpt (705 KB)
• Front Matter (221 KB)
• Table of Contents (85 KB)