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Poisson structure on manifolds with corners
Published 1 Jan 2016 in math.AG | (1601.00089v1)
Abstract: Since a Poisson Structure is a smooth bivector field, we use a ring-valued sheaf $\OO_{X}$ on a manifold with corners $X$, we can interpret $\OO_{X}(U)$ as the ring of admissible smooth functions where $U$ is an open subset on $X$, in this way, a poisson structure on $(X, \OO_{X})$ is a sheaf morphism $$ {-, -}: \OO_{X} \times \OO_{X} \longrightarrow \OO_{X} $$ which satisfies the Leibniz rule an also the Jacobi Identity.
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