UID:
almafu_9959227371802883
Format:
1 online resource (xvi, 247 pages) :
,
digital, PDF file(s).
ISBN:
1-107-21344-4
,
1-139-10721-6
,
1-283-29610-1
,
1-139-12308-4
,
9786613296108
,
1-139-12799-3
,
1-139-11733-5
,
1-139-11297-X
,
1-139-11516-2
Series Statement:
London Mathematical Society lecture note series ; 382
Content:
"This book introduces a new approach to building models of bounded arithmetic, with techniques drawn from recent results in computational complexity. Propositional proof systems and bounded arithmetics are closely related. In particular, proving lower bounds on the lengths of proofs in propositional proof systems is equivalent to constructing certain extensions of models of bounded arithmetic. This offers a clean and coherent framework for thinking about lower bounds for proof lengths, and it has proved quite successful in the past. This book outlines a brand new method for constructing models of bounded arithmetic, thus for proving independence results and establishing lower bounds for proof lengths. The models are built from random variables defined on a sample space which is a non-standard finite set and sampled by functions of some restricted computational complexity. It will appeal to anyone interested in logical approaches to fundamental problems in complexity theory"--
Note:
Title from publisher's bibliographic system (viewed on 05 Oct 2015).
,
pt. 1. Basics -- pt. 2. Second-order structures -- pt. 3. AC[superscript 0] world -- pt. 4. AC[superscript 0](2) world -- pt. 5. Towards proof complexity -- pt. 6. Proof complexity of F[subscript d] and F[subscript d]([xor]) -- pt. 7. Polynomial-time and higher worlds -- pt. 8. Proof complexity of EF and beyond.
,
English
Additional Edition:
ISBN 0-521-15433-2
Language:
English