Entire curves producing distinct Nevanlinna currents

Abstract

First, inspired by a question of Sibony, we show that in every compact complex manifold Y with certain Oka property, there exists some entire curve f: C→ Y generating all Nevanlinna/Ahlfors currents on Y, by holomorphic discs \fD(c, r)\c∈ C, r>0. Next, we answer positively a question of Yau, by constructing some entire curve g: C→ X in the product X:=E1× E2 of two elliptic curves E1 and E2, such that by using concentric holomorphic discs \gD r\r>0 we can obtain infinitely many distinct Nevanlinna/Ahlfors currents proportional to the extremal currents of integration along curves [\e1\× E2], [E1× \e2\] for all e1∈ E1, e2∈ E2 simultaneously. This phenomenon is new, and it shows tremendous holomorphic flexibility of entire curves in large scale geometry.