Field arithmetic / Michael D. Fried, Moshe Jarden.

This book uses algebraic tools to study the elementary properties of classes of fields and related algorithmic problems. The first part covers foundational material on infinite Galois theory, profinite groups, algebraic function fields in one variable and plane curves. It provides complete and eleme...

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Bibliographic Details
Main Authors:	Fried, Michael D., 1942- (Author), Jarden, Moshe, 1942- (Author)
Format:	eBook
Language:	English
Published:	Cham : Springer, [2023]
Edition:	Fourth edition.
Series:	Ergebnisse der Mathematik und ihrer Grenzgebiete ; 3. Folge, Bd. 11.
Subjects:	Algebraic fields. Algebraic number theory. Algebraic fields Algebraic number theory
Online Access:	Click for online access

MARC


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100	1		\|a Fried, Michael D., \|d 1942- \|e author. \|1 https://id.oclc.org/worldcat/entity/E39PBJccchJMrP3FD7P9FQJkXd
245	1	0	\|a Field arithmetic / \|c Michael D. Fried, Moshe Jarden.
250			\|a Fourth edition.
264		1	\|a Cham : \|b Springer, \|c [2023]
264		4	\|c ©2023
300			\|a 1 online resource (xxxi, 827 pages).
336			\|a text \|b txt \|2 rdacontent
337			\|a computer \|b c \|2 rdamedia
338			\|a online resource \|b cr \|2 rdacarrier
490	1		\|a Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge / A series of modern surveys in mathematics, \|x 2197-5655 ; \|v volume 11
504			\|a Includes bibliographical references and index.
520			\|a This book uses algebraic tools to study the elementary properties of classes of fields and related algorithmic problems. The first part covers foundational material on infinite Galois theory, profinite groups, algebraic function fields in one variable and plane curves. It provides complete and elementary proofs of the Chebotarev density theorem and the Riemann hypothesis for function fields, together with material on ultraproducts, decision procedures, the elementary theory of algebraically closed fields, undecidability and nonstandard model theory, including a nonstandard proof of Hilbert's irreducibility theorem. The focus then turns to the study of pseudo algebraically closed (PAC) fields, related structures and associated decidability and undecidability results. PAC fields (fields K with the property that every absolutely irreducible variety over K has a rational point) first arose in the elementary theory of finite fields and have deep connections with number theory. This fourth edition substantially extends, updates and clarifies the previous editions of this celebrated book, and includes a new chapter on Hilbertian subfields of Galois extensions. Almost every chapter concludes with a set of exercises and bibliographical notes. An appendix presents a selection of open research problems. Drawing from a wide literature at the interface of logic and arithmetic, this detailed and self-contained text can serve both as a textbook for graduate courses and as an invaluable reference for seasoned researchers.
505	0		\|a 1 Infinite Galois Theory and Profinite Groups -- 2 Valuations -- 3 Linear Disjointness -- 4 Algebraic Function Fields of One Variable -- 5 The Riemann Hypothesis for Function Fields -- 6 Plane Curves -- 7 The Chebotarev Density Theorem -- 8 Ultraproducts -- 9 Decision Procedures -- 10 Algebraically Closed Fields -- 11 Elements of Algebraic Geometry -- 12 Pseudo Algebraically Closed Fields -- 13 Hilbertian Fields -- 14 The Classical Hilbertian Fields -- 15 The Diamond Theorem -- 16 Nonstandard Structures -- 17 The Nonstandard Approach to Hilbert⁰́₉s Irreducibility Theorem -- 18 Galois Groups over Hilbertian Fields -- 19 Small Profinite Groups -- 20 Free Profinite Groups -- 21 The Haar Measure -- 22 Effective Field Theory and Algebraic Geometry -- 23 The Elementary Theory of ¿̐ư¿̐ư¿̐ư¿̐ư-Free PAC Fields -- 24 Problems of Arithmetical Geometry -- 25 Projective Groups and Frattini Covers -- 26 PAC Fields and Projective Absolute Galois Groups -- 27 Frobenius Fields -- 28 Free Profinite Groups of Infinite Rank -- 29 Random Elements in Profinite Groups -- 30 Omega-free PAC Fields -- 31 Hilbertian Subfields of Galois Extensions -- 32 Undecidability -- 33 Algebraically Closed Fields with Distinguished Automorphisms -- 34 Galois Stratification -- 35 Galois Stratification over Finite Fields -- 36 Problems of Field Arithmetic.
588	0		\|a Online resource; title from PDF title page (SpringerLink, viewed June 21, 2023).
650		0	\|a Algebraic fields.
650		0	\|a Algebraic number theory.
650		7	\|a Algebraic fields \|2 fast
650		7	\|a Algebraic number theory \|2 fast
700	1		\|a Jarden, Moshe, \|d 1942- \|e author. \|1 https://id.oclc.org/worldcat/entity/E39PBJwhyDYHCwbXqFfFcJJ7HC
776	0	8	\|i Print version: \|a Fried, Michael D. \|t Field Arithmetic \|d Cham : Springer,c2023 \|z 9783031280191
830		0	\|a Ergebnisse der Mathematik und ihrer Grenzgebiete ; \|v 3. Folge, Bd. 11. \|x 2197-5655
856	4	0	\|u https://holycross.idm.oclc.org/login?auth=cas&url=https://link.springer.com/10.1007/978-3-031-28020-7 \|y Click for online access
903			\|a SPRING-ALL2023
994			\|a 92 \|b HCD

Field arithmetic / Michael D. Fried, Moshe Jarden.

MARC

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