Introduction; Part I. Basic Concepts: 1. Concepts and problems; 2. Frege systems; 3. Sequent calculus; 4. Quantified propositional calculus; 5. Resolution; 6. Algebraic and geometric proof systems; 7. Further proof systems; Part II. Upper Bounds: 8. Basic example of the correspondence between theories and proof systems; 9. Two worlds of bounded arithmetic; 10. Up to EF via the <...> translation; 11. Examples of upper bounds and p-simulations; 12. Beyond EF via the || ... || translation; Part III. Lower Bounds: 13. R and R-like proof systems; 14. {LK}_{d + 1/2} and combinatorial restrictions; 15. F_d and logical restrictions; 16. Algebraic and geometric proof systems; 17. Feasible interpolation: a framework; 18. Feasible interpolation: applications; Part IV. Beyond Bounds: 19. Hard tautologies; 20. Model theory and lower bounds; 21. Optimality; 22. The nature of proof complexity; Bibliography; Special symbols; Index.
Offers a self-contained work presenting basic ideas, classical results, current state of the art and possible future directions in proof complexity.
Jan Krajíček is Professor of Mathematical Logic in the Faculty of Mathematics and Physics at Charles University, Prague. He is a member of the Academia Europaea and of the Learned Society of the Czech Republic. He has been an invited speaker at the European Congress of Mathematicians and at the International Congresses of Logic, Methodology and Philosophy of Science.
'… the book has very rich content and its bibliographical material
includes all previous books and survey articles related to proof
complexity.' Anahit Artashes Chubaryan, MathSciNet
'This book is in my view an excellent reference manual for a
fundamental topic in mathematical logic and theoretical computer
science.' Jaap van Oosten, Boekbesprekingen
|
Ask a Question About this Product More... |
|
