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arxiv: math/0101266 · v1 · pith:ZH46MTMUnew · submitted 2001-01-01 · 🧮 math.SG

On bilinear invariant differential operators acting on tensor fields on the symplectic manifold

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keywords operatorsinvariantspacediffmanifoldtensorbilineardifferential
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Let $M$ be an $n$-dimensional manifold, $V$ the space of a representation $\rho: GL(n)\longrightarrow GL(V)$. Locally, let $T(V)$ be the space of sections of the tensor bundle with fiber $V$ over a sufficiently small open set $U\subset M$, in other words, $T(V)$ is the space of tensor fields of type $V$ on $M$ on which the group $\Diff (M)$ of diffeomorphisms of $M$ naturally acts. Elsewhere, the author classified the $\Diff (M)$-invariant differential operators $D: T(V_{1})\otimes T(V_{2})\longrightarrow T(V_{3})$ for irreducible fibers with lowest weight. Here the result is generalized to bilinear operators invariant with respect to the group $\Diff_{\omega}(M)$ of symplectomorphisms of the symplectic manifold $(M, \omega)$. We classify all first order invariant operators; the list of other operators is conjectural. Among the new operators we mention a 2nd order one which determins an ``algebra'' structure on the space of metrics (symmetric forms) on $M$.

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