A+ CATEGORY SCIENTIFIC UNIT

Coupling tensors and Poisson geometry near a single symplectic leaf

Volume 54 / 2001

Yurii Vorobjev Banach Center Publications 54 (2001), 249-274 MSC: 53D17, 53D35, 70G45. DOI: 10.4064/bc54-0-14

Abstract

In the framework of the connection theory, a contravariant analog of the Sternberg coupling procedure is developed for studying a natural class of Poisson structures on fiber bundles, called coupling tensors. We show that every Poisson structure near a closed symplectic leaf can be realized as a coupling tensor. Our main result is a geometric criterion for the neighborhood equivalence between Poisson structures over the same leaf. This criterion gives a Poisson analog of the relative Darboux theorem due to Weinstein. Within the category of the algebroids, coupling tensors are introduced on the dual of the isotropy of a transitive Lie algebroid over a symplectic base. As a basic application of these results, we show that there is a well defined notion of a “linearized” Poisson structure over a symplectic leaf which gives rise to a natural model for the linearization problem.

Authors

  • Yurii VorobjevDepartment of Applied Mathematics
    Moscow State Institute of Electronics and Mathematics
    Moscow, Russia, 109028
    and
    Departamento de Matemáticas
    Universidad de Sonora
    Hermosillo, México, 83000
    e-mail
    e-mail

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