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Classification of (1,1) tensor fields and bihamiltonian structures

Francisco Turiel (1996)

Banach Center Publications

Consider a (1,1) tensor field J, defined on a real or complex m-dimensional manifold M, whose Nijenhuis torsion vanishes. Suppose that for each point p ∈ M there exist functions $f_{1}, . . ., f_{m}$ , defined around p, such that $(d f_{1} \land . . . \land d f_{m}) (p) \neq 0$ and $d (d f_{j} (J ())) (p) = 0$ , j = 1,...,m. Then there exists a dense open set such that we can find coordinates, around each of its points, on which J is written with affine coefficients. This result is obtained by associating to J a bihamiltonian structure on T*M.

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Classification of (1,1) tensor fields and bihamiltonian structures

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Problème de Cauchy pour les systèmes d'équations différentielles et microdifférentielles dans le domaine complexe

Problème de Cauchy pour les systèmes d'équations différentielles et microdifférentielles dans le domaine complexe

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Об асимптотическом поведении решений обратных задач для параболических уравнений.

Переопределенные параболические краевые задачи

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