Faddeev L.D., Takhtajan L., Reyman A.G. — Hamiltonian methods in the theory of solitons :: Электронная библиотека попечительского совета мехмата МГУ

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Faddeev L.D., Takhtajan L., Reyman A.G. — Hamiltonian methods in the theory of solitons

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Название: Hamiltonian methods in the theory of solitons

Авторы: Faddeev L.D., Takhtajan L., Reyman A.G.

Аннотация:

The main characteristic of this now classic exposition of the inverse scattering method and its applications to soliton theory is its consistent Hamiltonian approach to the theory. The nonlinear Schr?dinger equation, rather than the (more usual) KdV equation, is considered as a main example. The investigation of this equation forms the first part of the book. The second part is devoted to such fundamental models as the sine-Gordon equation, Heisenberg equation, Toda lattice, etc, the classification of integrable models and the methods for constructing their solutions.

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Рубрика: Математика/

Статус предметного указателя: Готов указатель с номерами страниц

ed2k: ed2k stats

Год издания: 2007

Количество страниц: 597

Добавлена в каталог: 07.03.2014

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Предметный указатель

Toda model, Poisson structure for      294 471 520
Toda model, quasi-periodic      471
Toda model, rapidly decreasing      475
Toda model, scattering of solitons in      498 507
Toda model, soliton for      496
Toda model, trace identities for      489
Toda model, transition coefficients for      481 483
Toda model, transition coefficients for, analytic properties of      481
Toda model, transition coefficients for, asymptotic expansion of      487-489
Toda model, transition coefficients for, evolution of      487
Toda model, transition coefficients for, normalization condition for      481
Toda model, transition coefficients for, Poisson brackets of      501-502
Toda model, transition matrix for      476
Toda model, transition matrix for, evolution equations for      486
Toda model, transition matrix for, Poisson brackets of      501-502
Toda model, two-dimensional      313-314
Toda model, virtual level in      477 482
Toda model,condition () for      485
Toda model,zero curvature condition for      294 314
Topological charge      285 427 431 436
Trace identities for the HM model      368
Trace identities for the NS model, rapidly decreasing      55
Trace identities for the NS model, rapidly decreasing, finite density      78
Trace identities for the SG model      407
Trace identities for the Toda model      489
Transition coefficients for continuous spectrum for the H M model      361
Transition coefficients for continuous spectrum for the NS model, finite density      62
Transition coefficients for continuous spectrum for the NS model, rapidly decreasing      45 50
Transition coefficients for continuous spectrum for the SG model      400
Transition coefficients for continuous spectrum for the Toda model      481
Transition coefficients for discrete spectrum for the HM model      363
Transition coefficients for discrete spectrum for the NS model, finite density      67
Transition coefficients for discrete spectrum for the NS model, rapidly decreasing      50
Transition coefficients for discrete spectrum for the SG model      401
Transition coefficients for discrete spectrum for the Toda model      483
Transition matrix      26
Transition matrix for the HM model      357
Transition matrix for the NS model      26

Transition matrix for the SG model      394
Transition matrix for the Toda model      476
Transmission coefficient      83 138
Triangle equation      268
Two-dimensional Toda equation      313
Two-dimensional Toda equation, Hamiltonian for      313
Ultralocality      190 553
Undressing procedure      341
Undressing procedurefor the principal chiral field      344
Unitarity condition      268
Variational derivative      13
Vector NS model      288
Virtual level      64 142 145 477
Volterra model      295
Volterra model, Hamiltonian for      295 520
Wess — Zumino term      349
Wiener — Hopf equation      90 97 119
Yang — Baxter equation      268
Zakharov — Shabat operator      79
Zero curvature condition for continuous models      20 113 146 199 333
Zero curvature condition for lattice models      293 337
Zero curvature representation      21-22 293 305-306 551-552
Zero curvature representation for the $LNS_{1}$ model      302
Zero curvature representation for the $LNS_{2}$ model      304
Zero curvature representation for the -wave model      309-310
Zero curvature representation for the chiral field model      312
Zero curvature representation for the chiral field model, modified      332
Zero curvature representation for the HM model      284
Zero curvature representation for the KdV model      307
Zero curvature representation for the LHM model      297
Zero curvature representation for the LL model      287
Zero curvature representation for the LLL model      514
Zero curvature representation for the NS model      21-22
Zero curvature representation for the NS model, vector      289
Zero curvature representation for the SG model      286
Zero curvature representation for the SG model in light-cone variables      450
Zero curvature representation for the Toda model      294
Zero curvature representation for the Toda model, two-dimensional      314
Zero curvature representation for the Volterra model      296

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