Complements of graphs of meromorphic functions and complete vector fields

Abstract

Given a meromorphic function s: C P1, we obtain a family of fiber-preserving dominating holomorphic maps from C2 onto C2 graph(s) defined in terms of the flows of complete vector fields of type C and of an entire function h:C whose graph does not meet graph(s), which was determined by Buzzard and Lu. In particular, we prove that the dominating map constructed by these authors to prove the dominability of C2 graph(s) is in the above family. We also study the complement of a double section in C×P1 in terms of a complex flow. Moreover, when s has at most one pole, we prove that there are infinitely many complete vector fields tangent to graph(s), describing explicit families of them with all their trajectories proper and of the same type (C or C), if graph(s) does not contain zeros; and families with almost all trajectories non-proper and of type C, or of type C, if graph(s) contains zeros. We also study the dominability of C2 A when A⊂ C2 is invariant by the flow of a complete holomorphic vector field.