Reverse mathematics, proofs from the inside out, John Stillwell
Type
Label
Reverse mathematics, proofs from the inside out, John Stillwell
Language
eng
Bibliography note
Includes bibliographical references (pages 168-172) and index
Illustrations
illustrations
Index
index present
Literary Form
non fiction
Main title
Reverse mathematics
Nature of contents
bibliography
Oclc number
983825003
Responsibility statement
John Stillwell
Sub title
proofs from the inside out
Summary
"This book presents reverse mathematics to a general mathematical audience for the first time. Reverse mathematics is a new field that answers some old questions. In the two thousand years that mathematicians have been deriving theorems from axioms, it has often been asked: which axioms are needed to prove a given theorem? Only in the last two hundred years have some of these questions been answered, and only in the last forty years has a systematic approach been developed. In Reverse Mathematics, John Stillwell gives a representative view of this field, emphasizing basic analysis--finding the "right axioms" to prove fundamental theorems--and giving a novel approach to logic. Stillwell introduces reverse mathematics historically, describing the two developments that made reverse mathematics possible, both involving the idea of arithmetization. The first was the nineteenth-century project of arithmetizing analysis, which aimed to define all concepts of analysis in terms of natural numbers and sets of natural numbers. The second was the twentieth-century arithmetization of logic and computation. Thus arithmetic in some sense underlies analysis, logic, and computation. Reverse mathematics exploits this insight by viewing analysis as arithmetic extended by axioms about the existence of infinite sets. Remarkably, only a small number of axioms are needed for reverse mathematics, and, for each basic theorem of analysis, Stillwell finds the "right axiom" to prove it. By using a minimum of mathematical logic in a well-motivated way, Reverse Mathematics will engage advanced undergraduates and all mathematicians interested in the foundations of mathematics."--, Provided by publisher
Table Of Contents
Historical introduction -- Classical arithmetization -- Classical analysis -- Computability -- Arithmetization of computation -- Arithmetical comprehension -- Recursive comprehension -- A bigger picture
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