Mathematics – Differential Geometry
Scientific paper
2010-10-02
compte rendu de l'acad\'emie des sciences de Paris, t.323, p.1237-1242, 1996
Mathematics
Differential Geometry
4 pages, proofs to be added
Scientific paper
We prove in this article that given a linearly concave domain $D$ in the projective space $\Bbb{CP}^{n}$, a 1-dimensional comlex analytic set $V$ in $D$, and a meromorphic 1-form $\phi$ on $V$, $V$ is a subset of an algebraic variety of $\Bbb{CP}^{n}$ and $\phi$ is the restriction to $V$ of an algebraic 1-form on $\Bbb{CP}^{n}$ if and only if the Abel transform $A(\phi \wedge [V])$ of the analytic current $\phi \wedge [V]$ is an algebraic 1-form on $(\Bbb{CP}^{n})*$, where an algebraic 1-form on $\Bbb{CP}^{n}$ is a meromorphic 1-form defined on a ramified analytic covering of $\Bbb{CP}^{n}$. This result has its origin in the general inverse Abel theorems of Lie, Darboux, Saint-Donat, Griffiths and Henkin.
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