Abel transformation and algebraic differential forms

Abstract

We prove in this article that given a linearly concave domain D in the projective space CPn, a 1-dimensional comlex analytic set V in D, and a meromorphic 1-form φ on V, V is a subset of an algebraic variety of CPn and φ is the restriction to V of an algebraic 1-form on CPn if and only if the Abel transform A(φ [V]) of the analytic current φ [V] is an algebraic 1-form on (CPn)*, where an algebraic 1-form on CPn is a meromorphic 1-form defined on a ramified analytic covering of CPn. This result has its origin in the general inverse Abel theorems of Lie, Darboux, Saint-Donat, Griffiths and Henkin.