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Models of Peano Arithmetic(Oxford Logic Guides Vol.15) H 302 p. 91

Kaye, Richard  著

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価格 \55,149(税込)         
発行年月 1991年01月
出版社/提供元
Oxford at the Clarendon Press
出版国 イギリス
言語 英語
媒体 冊子
装丁 hardcover
ページ数/巻数 302 p., line illus.
ジャンル 洋書
ISBN 9780198532132
商品コード 0209021841
商品URLhttps://kw.maruzen.co.jp/ims/itemDetail.html?itmCd=0209021841

内容

Nonstandard models of arithmetic are of interest to mathematicians through the presence of infinite (or nonstandard) integers and the various properties they inherit from the finite integers. Since their introduction in the 1930s (by Skolem and Gödel ), they have come to play an important role in model theory, and in combinatorics through independence results such as the Paris-Harrington theorem. This book is an introduction to these developments, and stresses the interplay between the first-order theory, recursion-theoretic aspects, and the structural properties of these models. Prerequisites have been kept to a minimum. A basic grounding in elementary model theory and a familiarity with the notions of recursive, primitive recursive, and r.e. sets will be sufficient. Consequently, the book should be suitable for postgraduate students coming to the subject for the first time and a variety of exercises of varying degrees of difficulty will help to further the reader's understanding. Beginning with Gödel's incompleteness theorem, the book covers the prime models, cofinal extensions, end extensions, Gaifman's construction of a definable type, Tennenbaum's theorem, Friedman's theorem and subsequent work on indicators, and culminates in a chapter on recursive saturation and resplendency.

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