Kuksin, Sergej B.
Nearly Integrable Infinite-Dimensional Hamiltonian Systems [electronic resource] / by Sergej B. Kuksin. - Berlin, Heidelberg : Springer Berlin Heidelberg, 1993. - XXVIII, 104 p. online resource. - Lecture Notes in Mathematics, 1556 0075-8434 ; . - Lecture Notes in Mathematics, 1556 .
Symplectic structures and hamiltonian systems in scales of hilbert spaces -- Statement of the main theorem and its consequences -- Proof of the main theorem.
The book is devoted to partial differential equations of Hamiltonian form, close to integrable equations. For such equations a KAM-like theorem is proved, stating that solutions of the unperturbed equation that are quasiperiodic in time mostly persist in the perturbed one. The theorem is applied to classical nonlinear PDE's with one-dimensional space variable such as the nonlinear string and nonlinear Schr|dinger equation andshow that the equations have "regular" (=time-quasiperiodic and time-periodic) solutions in rich supply. These results cannot be obtained by other techniques. The book will thus be of interest to mathematicians and physicists working with nonlinear PDE's. An extensivesummary of the results and of related topics is provided in the Introduction. All the nontraditional material used is discussed in the firstpart of the book and in five appendices.
9783540479208
10.1007/BFb0092243 doi
Mathematics.
Global analysis (Mathematics).
Mathematics.
Analysis.
QA299.6-433
515
Nearly Integrable Infinite-Dimensional Hamiltonian Systems [electronic resource] / by Sergej B. Kuksin. - Berlin, Heidelberg : Springer Berlin Heidelberg, 1993. - XXVIII, 104 p. online resource. - Lecture Notes in Mathematics, 1556 0075-8434 ; . - Lecture Notes in Mathematics, 1556 .
Symplectic structures and hamiltonian systems in scales of hilbert spaces -- Statement of the main theorem and its consequences -- Proof of the main theorem.
The book is devoted to partial differential equations of Hamiltonian form, close to integrable equations. For such equations a KAM-like theorem is proved, stating that solutions of the unperturbed equation that are quasiperiodic in time mostly persist in the perturbed one. The theorem is applied to classical nonlinear PDE's with one-dimensional space variable such as the nonlinear string and nonlinear Schr|dinger equation andshow that the equations have "regular" (=time-quasiperiodic and time-periodic) solutions in rich supply. These results cannot be obtained by other techniques. The book will thus be of interest to mathematicians and physicists working with nonlinear PDE's. An extensivesummary of the results and of related topics is provided in the Introduction. All the nontraditional material used is discussed in the firstpart of the book and in five appendices.
9783540479208
10.1007/BFb0092243 doi
Mathematics.
Global analysis (Mathematics).
Mathematics.
Analysis.
QA299.6-433
515