Spectral Methods in Soliton Equations

Spectral Methods in Soliton Equations
Title Spectral Methods in Soliton Equations PDF eBook
Author I D Iliev
Publisher CRC Press
Pages 412
Release 1994-11-21
Genre Mathematics
ISBN 9780582239630

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Soliton theory as a method for solving some classes of nonlinear evolution equations (soliton equations) is one of the most actively developing topics in mathematical physics. This book presents some spectral theory methods for the investigation of soliton equations ad the inverse scattering problems related to these equations. The authors give the theory of expansions for the Sturm-Liouville operator and the Dirac operator. On this basis, the spectral theory of recursion operators generating Korteweg-de Vries type equations is presented and the Ablowitz-Kaup-Newell-Segur scheme, through which the inverse scattering method could be understood as a Fourier-type transformation, is considered. Following these ideas, the authors investigate some of the questions related to inverse spectral problems, i.e. uniqueness theorems, construction of explicit solutions and approximative methods for solving inverse scattering problems. A rigorous investigation of the stability of soliton solutions including solitary waves for equations which do not allow integration within inverse scattering method is also presented.

Spectral Methods

Spectral Methods
Title Spectral Methods PDF eBook
Author Jie Shen
Publisher Springer Science & Business Media
Pages 481
Release 2011-08-25
Genre Mathematics
ISBN 3540710418

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Along with finite differences and finite elements, spectral methods are one of the three main methodologies for solving partial differential equations on computers. This book provides a detailed presentation of basic spectral algorithms, as well as a systematical presentation of basic convergence theory and error analysis for spectral methods. Readers of this book will be exposed to a unified framework for designing and analyzing spectral algorithms for a variety of problems, including in particular high-order differential equations and problems in unbounded domains. The book contains a large number of figures which are designed to illustrate various concepts stressed in the book. A set of basic matlab codes has been made available online to help the readers to develop their own spectral codes for their specific applications.

Spectral Methods in Quantum Field Theory

Spectral Methods in Quantum Field Theory
Title Spectral Methods in Quantum Field Theory PDF eBook
Author Noah Graham
Publisher Springer Science & Business Media
Pages 187
Release 2009-05-08
Genre Science
ISBN 3642001386

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In this monograph we apply scattering theory methods to calculations in quantum ?eld theory, with a particular focus on properties of the quantum vacuum. These methods will provide e?cient and reliable solutions to a - riety of problems in quantum ?eld theory. Our approach will also elucidate in a concrete context many of the subtleties of quantum ?eld theory, such as divergences, regularization, and renormalization, by connecting them to more familiar results in quantum mechanics. We will use tools of scattering theory to characterize the spectrum of energyeigenstatesinapotentialbackground,hencethetermspectralmethods. This mode spectrum comprises both discrete bound states and a continuum of scattering states. We develop a powerful formalism that parameterizes the e?ects of the continuum by the density of states, which we compute from scattering data. Summing the zero-point energies of these modes gives the energy of the quantum vacuum, which is one of the central quantities we study.Althoughthemostcommonlystudiedbackgroundpotentialsarisefrom static soliton solutions to the classical equations of motion, these methods are not limited to such cases.

Chebyshev and Fourier Spectral Methods

Chebyshev and Fourier Spectral Methods
Title Chebyshev and Fourier Spectral Methods PDF eBook
Author John P. Boyd
Publisher Courier Corporation
Pages 690
Release 2001-12-03
Genre Mathematics
ISBN 0486411834

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Completely revised text focuses on use of spectral methods to solve boundary value, eigenvalue, and time-dependent problems, but also covers Hermite, Laguerre, rational Chebyshev, sinc, and spherical harmonic functions, as well as cardinal functions, linear eigenvalue problems, matrix-solving methods, coordinate transformations, methods for unbounded intervals, spherical and cylindrical geometry, and much more. 7 Appendices. Glossary. Bibliography. Index. Over 160 text figures.

Spectral and High-order Methods with Applications

Spectral and High-order Methods with Applications
Title Spectral and High-order Methods with Applications PDF eBook
Author Jie Shen
Publisher
Pages 224
Release 2006
Genre Calculus
ISBN 9787030177223

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中国科学院科学出版基金资助出版。

Spectral Methods in Soliton Equations

Spectral Methods in Soliton Equations
Title Spectral Methods in Soliton Equations PDF eBook
Author I. D. Iliev
Publisher Halsted Press
Pages 384
Release 1994-12-01
Genre Mathematics
ISBN 9780470234778

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Soliton Equations and Their Algebro-Geometric Solutions: Volume 2, (1+1)-Dimensional Discrete Models

Soliton Equations and Their Algebro-Geometric Solutions: Volume 2, (1+1)-Dimensional Discrete Models
Title Soliton Equations and Their Algebro-Geometric Solutions: Volume 2, (1+1)-Dimensional Discrete Models PDF eBook
Author Fritz Gesztesy
Publisher Cambridge University Press
Pages 438
Release 2008-09-04
Genre Mathematics
ISBN 1139473778

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As a partner to Volume 1: Dimensional Continuous Models, this monograph provides a self-contained introduction to algebro-geometric solutions of completely integrable, nonlinear, partial differential-difference equations, also known as soliton equations. The systems studied in this volume include the Toda lattice hierarchy, the Kac-van Moerbeke hierarchy, and the Ablowitz-Ladik hierarchy. An extensive treatment of the class of algebro-geometric solutions in the stationary as well as time-dependent contexts is provided. The theory presented includes trace formulas, algebro-geometric initial value problems, Baker-Akhiezer functions, and theta function representations of all relevant quantities involved. The book uses basic techniques from the theory of difference equations and spectral analysis, some elements of algebraic geometry and especially, the theory of compact Riemann surfaces. The presentation is constructive and rigorous, with ample background material provided in various appendices. Detailed notes for each chapter, together with an exhaustive bibliography, enhance understanding of the main results.