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Spectral Methods in Soliton Equations (Monographs and Surveys in Pure and Applied Mathematics) download epub

by Eugeni Khristov,Kiril Petrov Kirchev,I D Iliev


Epub Book: 1628 kb. | Fb2 Book: 1592 kb.

I D Iliev, Eugeni Khristov, Kiril Petrov Kirchev.

I D Iliev, Eugeni Khristov, Kiril Petrov Kirchev. Chapman and Hall/CRC Published November 21, 1994 Reference - 400 Pages ISBN 9780582239630 - CAT LM3963 Series: Monographs and Surveys in Pure and Applied Mathematics. For Instructors Request Inspection Copy.

Spectral methods in soliton equations. Pitman Monographs and Surveys in Pure and Applied Mathematics, vol. 73. Wiley, New-York (1994)Google Scholar. 11. Lombardo, . Mikhailov, . Reductions of integrable equations. Dihedral Group J. Phys. A 37, 7727–7742 (2004)MATHGoogle Scholar. The reduction problem and inverse scattering method.

The book also addresses classical Faber–Krahn inequalities for elliptic and time-periodic problems and extends .

The book also addresses classical Faber–Krahn inequalities for elliptic and time-periodic problems and extends the linear theory for scalar nonautonomous and random parabolic equations to cooperative systems. The final chapter presents applications to Kolmogorov systems of parabolic equations. By thoroughly explaining the spectral theory for nonautonomous and random linear parabolic equations, this resource reveals the importance of the theory in examining nonlinear problems. Скачать (pdf, . 5 Mb) Читать. Epub FB2 mobi txt RTF. Pitman Monographs and Surveys in Pure and Applied Mathematics 73. 12. Magri, . A simple model of the integrable Hamiltonian equations. 19, 1156–1162 (1978)ogle Scholar.

Soliton theory as a method for solving some classes of nonlinear evolution equations (soliton equations) is one of the most actively developing topics in. .By I D Iliev, Eugeni Khristov, Kiril Petrov Kirchev. Chapman and Hall/CRC.

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.

Kirchev, Spectral methods in soliton equations. Longman Scientific & Technical, Harlow; copublished in the United States with John Wiley & Sons, In. New York, 1994

Kirchev, Spectral methods in soliton equations. New York, 1994. Total Positivity and the Stability of Internal Waves in Stratified Fluids of Finite Depth.

Algebraic and spectral methods for nonlinear wave equations by N. Asano, Y. Kato, March 1991, Longman . Algebraic and Spectral Methods for Non-Linear Wave Equations (Pitman Monographs and Surveys in Pure and Applied Mathematics, Vol. 49). by N. Kato.

Algebraic and Spectral Methods for Non-Linear Wave Equations (Pitman Monographs and Surveys in Pure and Applied Mathematics, Vol. Published March 1991 by Longman Sc & Tech.

Spectral Methods in Soliton Equations. Introduction Spectral theory of the regular A-operators Spectral theory for A-operators on the semi-axis A-operators on the line and nonlinear evolution equations Stability of solitary wave solution. More). Local Well-Posedness and Orbital Stability of Solitary Wave Solutions for the Generalized Camassa–Holm Equation. Sevdzhan Hakkaev, Kiril Kirchev. ABSTRACT We establish local well-posedness in the Sobolev space H s with any for the generalized Camassa–Holm equation. Furthermore, we consider the stability and instability problem of the solitar.

The method of compensated compactness as a technique for studying hyperbolic conservation laws is of fundamental importance in many branches of applied mathematics. Offering the first comprehensive treatment, Hyperbolic Conservation Laws and the Compensated Compactness Method gathers to The method of compensated compactness as a technique for studying hyperbolic conservation laws is of fundamental importance in many branches of applied mathematics.

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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 in Soliton Equations (Monographs and Surveys in Pure and Applied Mathematics) download epub
Mathematics
Author: Eugeni Khristov,Kiril Petrov Kirchev,I D Iliev
ISBN: 058223963X
Category: Science & Math
Subcategory: Mathematics
Language: English
Publisher: Chapman and Hall/CRC; 1 edition (November 21, 1994)
Pages: 384 pages