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Algebraic Methods in Nonlinear Perturbation Theory

Bogaevski, Vladamir N.

eBook Springer <editore> 1991

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Descrizione *Algebraic Methods in Nonlinear Perturbation Theory / V. N. Bogaevski, A. Povzner. - New York : Springer-Verlag, 1991. - XII, 265 p. : ill. ; 25 cm
ISBN E-Book 9781461244387
Collana Applied mathematical sciences , 88
Primo Autore
Bogaevski, Vladamir N.
Coautore
Povzner, Aleksandr I.
Soggetti 34-XX - Ordinary differential equations [MSC 2020]
34B20 - Weyl theory and its generalizations for ordinary differential equations [MSC 2020]
34C20 - Transformation and reduction of ordinary differential equations and systems, normal forms [MSC 2020]
34D10 - Perturbations of ordinary differential equation [MSC 2020]
34E10 - Perturbations, asymptotics of solutions to ordinary differential equation [MSC 2020]
37J40 - Perturbations of finite-dimensional Hamiltonian systems, normal forms, small divisors, KAM theory, Arnol'd diffusion [MSC 2020]
76D33 - Waves for incompressible viscous fluids [MSC 2020]
Parole chiave Algebra
Applied Mathematics
Bifurcation
Differential equations
Eigenvalues
Electromagnetic Fields
Fields
Manifolds
Matrix
Ordinary differential equations
Transformations
Titolo dell'opera Algebraicheski metody v nelineinoi teori vozmushchenii
Luogo pubblicazione New York
Editori Springer <editore>
Anno pubblicazione 1991
Thesauri 34-XX
34B20
34C20
34D10
34E10
37J40
76D33
Ordinary differential equations [MSC 2020]
Perturbations of finite-dimensional Hamiltonian systems, normal forms, small divisors, KAM theory, Arnol'd diffusion [MSC 2020]
Perturbations of ordinary differential equation [MSC 2020]
Perturbations, asymptotics of solutions to ordinary differential equation [MSC 2020]
Transformation and reduction of ordinary differential equations and systems, normal forms [MSC 2020]
Waves for incompressible viscous fluids [MSC 2020]
Weyl theory and its generalizations for ordinary differential equations [MSC 2020]