Immersions of open Riemann surfaces into the Riemann sphere
Abstract
In this paper we show that the space of holomorphic immersions from any given open Riemann surface, M, into the Riemann sphere CP1 is weakly homotopy equivalent to the space of continuous maps from M to the complement of the zero section in the tangent bundle of CP1. We show in particular that this space has 2k path components, where H1(M, Z)= Zk. We also prove a parametric version of Mergelyan approximation theorem for maps from Riemann surfaces into any complex manifold, a result used in the proof of our main theorem.
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