Compact complete null curves in Complex 3-space

Abstract

We prove that for any open orientable surface S of finite topology, there exist a Riemann surface M, a relatively compact domain M⊂M and a continuous map X:M3 such that: M and M are homeomorphic to S, M-M and M-M contain no relatively compact components in M, X|M is a complete null holomorphic curve, X|M-M:M-M3 is an embedding and the Hausdorff dimension of X(M-M) is 1. Moreover, for any ε>0 and compact null holomorphic curve Y:N3 with non-empty boundary Y(∂ N), there exist Riemann surfaces M and M homeomorphic to N and a map X:M3 in the above conditions such that δH(Y(∂ N),X(M-M))<ε, where δH(·,·) means Hausdorff distance in C3.