On the Topological Structure Of Complex Tangencies to Embeddings of S3 into C3

Abstract

In the mid-1980's, M. Gromov used his machinery of the h-principle to prove that there exists totally real embeddings of S3 into C3. Subsequently, Patrick Ahern and Walter Rudin explicitly demonstrated such a totally real embedding. In this paper, we consider the generic situation for such embeddings, namely where complex tangents arise as codimension-2 subspaces. We first consider the Heisenberg group H and generate some interesting results there-in. Then, by using the biholomorphism of H with the 3-sphere minus a point, we demonstrate that every homeomorphism-type of knot in S3 may arise precisely as the set of complex tangents to an embedding S3 C3. We also make note of the (non-generic) situation where complex tangents arise along surfaces.