"From the point of view of the foundations of mathematics, this definitive work by Simpson is the most anxiously awaited monograph for over a decade. The "subsystems of second order arithmetic" provide the basic formal systems normally used in our current understanding of the logical structure of classical mathematics. Simpson provides an encyclopedic treatment of these systems with an emphasis on *Hilbert's program* (where infinitary mathematics is to be secured or reinterpreted by finitary mathematics), and the emerging *reverse mathematics* (where axioms necessary for providing theorems are determined by deriving axioms from theorems). The classical mathematical topics treated in these axiomatic terms are very diverse, and include standard topics in complete separable metric spaces and Banach spaces, countable groups, rings, fields, and vector spaces, ordinary differential equations, fixed points, infinite games, Ramsey theory, and many others. The material, with its many open problems and detailed references to the literature, is particularly valuable for proof theorists and recursion theorists. The book is both suitable for the beginning graduate student in mathematical logic, and encyclopedic for the expert." Harvey Friedman, Ohio State University
Author(s): Stephen G. Simpson
Series: Perspectives in Mathematical Logic
Edition: 1st
Publisher: Springer
Year: 1999
Language: English
Pages: 449
Content:
Front Matter....Pages I-XIV
Introduction....Pages 1-59
Front Matter....Pages 61-61
Recursive Comprehension....Pages 61-103
Arithmetical Comprehension....Pages 105-125
Weak K?nig’s Lemma....Pages 127-165
Arithmetical Transfinite Recursion....Pages 167-215
п 1 1 Comprehension....Pages 217-241
Front Matter....Pages 243-243
?-Models....Pages 245-311
?-Models....Pages 313-362
Non-?-Models....Pages 363-392
Front Matter....Pages 393-393
Additional Results....Pages 395-412
Back Matter....Pages 413-445