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Topological Solitons.[electronic res...

Ebooks Corporation.

Topological Solitons.[electronic resource].

紀錄類型:	書目-語言資料,印刷品 : Monograph/item
杜威分類號:	530.14
書名/作者:	Topological Solitons.
作者:	Manton, Nicholas.
其他作者:	Landshoff, P. V.
出版者:	Cambridge : : Cambridge University Press,, 2004.
面頁冊數:	507 p.
ISBN:	9780511617034 (electronic bk.)
ISBN:	9780521838368 (print)
內容註:	Cover; Half-title; Series-title; Title; Copyright; Contents; Preface; 1 Introduction; 1.1 Solitons as particles; 1.2 A brief history of topological solitons; 1.3 Bogomolny equations and moduli spaces; 1.4 Soliton dynamics; 1.5 Solitons and integrable systems; 1.6 Solitons – experimental status; 1.7 Outline of this book; 2 Lagrangians and fields; 2.1 Finite-dimensional systems; 2.2 Symmetries and conservation laws; 2.3 Field theory; 2.4 Noether’s theorem in field theory; 2.5 Vacua and spontaneous symmetry breaking; 2.6 Gauge theory; 2.7 The Higgs mechanism; 2.8 Gradient flow in field theory
摘要、提要註:	This book introduces the main examples of topological solitons in classical field theories, discusses the forces between solitons, and surveys both static and dynamic multi-soliton solutions. It covers kinks in one dimension, lumps and vortices in two dimensions, monopoles and Skyrmions in three dimensions, and instantons in four dimensions.
電子資源:	Click here to view book

Topological Solitons.[electronic resource].
Manton, Nicholas.

Topological Solitons.[electronic resource]. - Cambridge :Cambridge University Press,2004. - 507 p.

Cover; Half-title; Series-title; Title; Copyright; Contents; Preface; 1 Introduction; 1.1 Solitons as particles; 1.2 A brief history of topological solitons; 1.3 Bogomolny equations and moduli spaces; 1.4 Soliton dynamics; 1.5 Solitons and integrable systems; 1.6 Solitons – experimental status; 1.7 Outline of this book; 2 Lagrangians and fields; 2.1 Finite-dimensional systems; 2.2 Symmetries and conservation laws; 2.3 Field theory; 2.4 Noether’s theorem in field theory; 2.5 Vacua and spontaneous symmetry breaking; 2.6 Gauge theory; 2.7 The Higgs mechanism; 2.8 Gradient flow in field theory

This book introduces the main examples of topological solitons in classical field theories, discusses the forces between solitons, and surveys both static and dynamic multi-soliton solutions. It covers kinks in one dimension, lumps and vortices in two dimensions, monopoles and Skyrmions in three dimensions, and instantons in four dimensions.

Electronic reproduction.

Available via World Wide Web.

Mode of access: World Wide Web.

ISBN: 9780511617034 (electronic bk.)Index Terms--Genre/Form:

336502
Electronic books.

LC Class. No.: QC174.26. W28 / M36 2004

Dewey Class. No.: 530.14

Topological Solitons.[electronic resource].
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020 $a 9780511617034 (electronic bk.)
020 $a 9780521838368 (print)
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050 0 0 $a QC174.26. W28 $b M36 2004
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100 1 $a Manton, Nicholas. $3 383499
245 1 0 $a Topological Solitons. $h [electronic resource].
260 $a Cambridge : $b Cambridge University Press, $c 2004.
300 $a 507 p.
505 0 $a Cover; Half-title; Series-title; Title; Copyright; Contents; Preface; 1 Introduction; 1.1 Solitons as particles; 1.2 A brief history of topological solitons; 1.3 Bogomolny equations and moduli spaces; 1.4 Soliton dynamics; 1.5 Solitons and integrable systems; 1.6 Solitons – experimental status; 1.7 Outline of this book; 2 Lagrangians and fields; 2.1 Finite-dimensional systems; 2.2 Symmetries and conservation laws; 2.3 Field theory; 2.4 Noether’s theorem in field theory; 2.5 Vacua and spontaneous symmetry breaking; 2.6 Gauge theory; 2.7 The Higgs mechanism; 2.8 Gradient flow in field theory
505 8 $a 3 Topology in field theory3.1 Homotopy theory; 3.2 Topological degree; 3.3 Gauge fields as differential forms; 3.4 Chern numbers of abelian gauge .elds; 3.5 Chern numbers for non-abelian gauge fields; 3.6 Chern-Simons forms; 4 Solitons – general theory; 4.1 Topology and solitons; 4.2 Scaling arguments; 4.3 Symmetry and reduction of dimension; 4.4 Principle of symmetric criticality; 4.5 Moduli spaces and soliton dynamics; 5 Kinks; 5.1
520 $a This book introduces the main examples of topological solitons in classical field theories, discusses the forces between solitons, and surveys both static and dynamic multi-soliton solutions. It covers kinks in one dimension, lumps and vortices in two dimensions, monopoles and Skyrmions in three dimensions, and instantons in four dimensions.
533 $a Electronic reproduction. $n Available via World Wide Web.
538 $a Mode of access: World Wide Web.
655 7 $a Electronic books. $2 local $3 336502
700 1 $a Landshoff, P. V. $3 380928
700 1 $a Nelson, D. R. $3 380929
700 1 $a Sutcliffe, Paul. $3 383500
700 1 $a Weinberg, S. $3 380931
710 2 $a Ebooks Corporation. $3 380544
776 1 $z 9780521838368
856 4 0 $z Click here to view book $u http://ebooks.cambridge.org/ebook.jsf?bid=CBO9780511617034

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