Thinking About Godel And Turing: Essays On Complexity, 1970a07 (e-bog) af Gregory J Chaitin, Chaitin

Thinking About Godel And Turing: Essays On Complexity, 1970a07 e-bog

509,93 DKK (inkl. moms 637,41 DKK)
Dr Gregory Chaitin, one of the world's leading mathematicians, is best known for his discovery of the remarkable I number, a concrete example of irreducible complexity in pure mathematics which shows that mathematics is infinitely complex. In this volume, Chaitin discusses the evolution of these ideas, tracing them back to Leibniz and Borel as well as Godel and Turing.This book contains 23 non...
E-bog 509,93 DKK
Forfattere Gregory J Chaitin, Chaitin (forfatter)
Udgivet 6 august 2007
Længde 368 sider
Genrer Philosophy of mathematics
Sprog English
Format pdf
Beskyttelse LCP
ISBN 9789814474702
Dr Gregory Chaitin, one of the world's leading mathematicians, is best known for his discovery of the remarkable I number, a concrete example of irreducible complexity in pure mathematics which shows that mathematics is infinitely complex. In this volume, Chaitin discusses the evolution of these ideas, tracing them back to Leibniz and Borel as well as Godel and Turing.This book contains 23 non-technical papers by Chaitin, his favorite tutorial and survey papers, including Chaitin's three Scientific American articles. These essays summarize a lifetime effort to use the notion of program-size complexity or algorithmic information content in order to shed further light on the fundamental work of Godel and Turing on the limits of mathematical methods, both in logic and in computation. Chaitin argues here that his information-theoretic approach to metamathematics suggests a quasi-empirical view of mathematics that emphasizes the similarities rather than the differences between mathematics and physics. He also develops his own brand of digital philosophy, which views the entire universe as a giant computation, and speculates that perhaps everything is discrete software, everything is 0's and 1's.Chaitin's fundamental mathematical work will be of interest to philosophers concerned with the limits of knowledge and to physicists interested in the nature of complexity.