Bi-Hamiltonian structures and singularities of integrable systems

Hamiltonian system on a Poisson manifold M is called integrable if it possesses sufficiently many commuting first integrals f1, . . . fs which are functionally independent on M almost everywhere. We study the structure of the singular set K where the differentials df1, . . . , dfs become linearly de...

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Bibliographic Details
Main Authors: Alexey Bolsinov, A.A. Oshemkov
Format: Default Article
Published: 2009
Subjects:
Other mathematical sciences not elsewhere classified
Integrable Hamiltonian systems
Compatible Poisson structures
Lagrangian fibrations
Bifurcations
Semisimple Lie algebras
Mathematical Sciences not elsewhere classified
Online Access:https://hdl.handle.net/2134/15958
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