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Infinite-dimensional Hamiltonian systems
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General topics
Equations of mathematical physics and other areas of application
skos:inScheme
MSC 2010
broader concept
Dynamical systems and ergodic theory
narrower concept
Hamiltonian structures, symmetries, variational principles, conservation laws
Completely integrable systems, integrability tests, bi-Hamiltonian structures, hierarchies (KdV, KP, Toda, etc.)
Integration of completely integrable systems by inverse spectral and scattering methods
Relations with algebraic geometry, complex analysis, special functions
Relations with differential geometry
Relations with infinite-dimensional Lie algebras and other algebraic structures
Lie-Bäcklund and other transformations
Soliton theory, asymptotic behavior of solutions
Stability problems
Bifurcation problems
Perturbations, KAM for infinite-dimensional systems
Lattice dynamics
Hamiltonian systems on groups of diffeomorphisms and on manifolds of mappings and metrics
None of the above, but in MSC2010 section 37Kxx
skos:prefLabel
Infinite-dimensional Hamiltonian systems
Sistemi hamiltoniani infinito-dimensionali
无限维Hamilton系统
skos:exactMatch
http://msc2010.org/resources/MSC/2000/37Kxx
skos:altLabel
Sistemi hamiltoniani infinito-dimensionali [Vedi anche 35Axx, 35Qxx]
Infinite-dimensional Hamiltonian systems [See also 35Axx, 35Qxx]
无限维Hamilton系统[参见35Axx, 35Qxx]
http://msc2010.org...0/msc2010#seeAlso
General topics
Equations of mathematical physics and other areas of application
skos:notation
37Kxx
skos:note
See also 35Axx, 35Qxx.
skos:semanticRelation
General topics
Equations of mathematical physics and other areas of application
is
rdfs:seeAlso
of
Differential equations in abstract spaces
Noncommutative dynamical systems
Nonlinear evolution equations
Classical field theories
is
Subject
of
Well-posedness and regularity of hyperbolic boundary control systems on a one-dimensional spatial domain
is
broader concept
of
Hamiltonian structures, symmetries, variational principles, conservation laws
Completely integrable systems, integrability tests, bi-Hamiltonian structures, hierarchies (KdV, KP, Toda, etc.)
Integration of completely integrable systems by inverse spectral and scattering methods
Relations with algebraic geometry, complex analysis, special functions
Relations with differential geometry
Relations with infinite-dimensional Lie algebras and other algebraic structures
Lie-Bäcklund and other transformations
Soliton theory, asymptotic behavior of solutions
Stability problems
Bifurcation problems
Perturbations, KAM for infinite-dimensional systems
Lattice dynamics
Hamiltonian systems on groups of diffeomorphisms and on manifolds of mappings and metrics
None of the above, but in MSC2010 section 37Kxx
is
narrower concept
of
Dynamical systems and ergodic theory
is
http://msc2010.org...0/msc2010#seeAlso
of
Differential equations in abstract spaces
Noncommutative dynamical systems
Nonlinear evolution equations
Classical field theories
is
skos:semanticRelation
of
Differential equations in abstract spaces
Noncommutative dynamical systems
Nonlinear evolution equations
Classical field theories
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