Complex Tangencies to Embeddings of Heisenberg Groups and Odd-Dimensional Spheres

Abstract

The notion of a complex tangent arises for embeddings of real manifolds into complex spaces. It is of particular interest when studying embeddings of real n-dimensional manifolds into Cn. The generic topological structure of the set complex tangents to such embeddings Mn Cn takes the form of a (stratified) (n-2)-dimensional submanifiold of Mn. In this paper, we generalize our results from our previous work for the 3-dimensional sphere and the Heisenberg group to obtain results regarding the possible topological configurations of the sets of complex tangents to embeddings of odd-dimensional spheres S2n-1 C2n-1 by first considering the situation for the higher dimensional analogues of the Heisenberg group.