Properness of associated minimal surfaces
Abstract
We prove that for any open Riemann surface N and finite subset Z⊂ S1=\z∈C\,|\;|z|=1\, there exist an infinite closed set ZN ⊂ S1 containing Z and a null holomorphic curve F=(Fj)j=1,2,3:N3 such that the map Y:ZN× N R2, Y(v,P)=Re(v(F1,F2)(P)), is proper. In particular, Re(vF):N 3 is a proper conformal minimal immersion properly projecting into R2=R2×\0\⊂R3, for all v ∈ ZN.
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