Entire curves generating all shapes of Nevanlinna currents

Abstract

First, we show that every complex torus T contains some entire curve g: C→ T such that the concentric holomorphic discs \g Dr\r>0 can generate all the Nevanlinna/Ahlfors currents on T at cohomological level. This confirms an anticipation of Sibony. Developing further our new method, we can construct some twisted entire curve f: C→ CP1× E in the product of the rational curve CP1 and an elliptic curve E, such that, concerning Siu's decomposition, demanding any cardinality |J|∈ Z≥slant 0 \∞\ and that Tdiff is trivial (|J|≥slant 1) or not (|J|≥slant 0), we can always find a sequence of concentric holomorphic discs \f Drj\j ≥slant 1 to generate a Nevanlinna/Ahlfors current T=Talg+Tdiff with the singular part Talg=Σj∈ J \,λj·[ Cj] in the desired shape. This fulfills the missing case where |J|=0 in the previous work of Huynh-Xie. By a result of Duval, each Cj must be rational or elliptic. We will show that there is no a priori restriction on the numbers of rational and elliptic components in the support of Talg, thus answering a question of Yau and Zhou. Moreover, we will show that the positive coefficients \λj\j∈ J can be arbitrary as long as the total mass of Talg is less than or equal to 1. Our results foreshadow striking holomorphic flexibility of entire curves in Oka geometry, which deserves further exploration.

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