Generating all Ahlfors currents by a single entire curve

Abstract

Let \(X\) be a compact complex manifold possessing the Runge approximation property on discs, meaning that every holomorphic map from a closed disc into \(X\) is approximable by a global holomorphic map from \(C\). We construct an entire curve \(F : C X\) such that the associated family of concentric holomorphic discs \(\F|Dr\r>0\) generates all Ahlfors currents on \(X\), thereby settling a conjecture of Sibony.

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