A Topological Obstruction to the Removal of a Degenerate Complex Tangent and Some Related Homotopy and Homology Groups

Abstract

In this article, we derive a topological obstruction to the removal of a isolated degenerate complex tangent to an embedding of a 3-manifold into C3 (without affecting the structure of the remaining complex tangents). We demonstrate how the vanishing of this obstruction is both a necessary and sufficient condition for the (local) removal of the isolated complex tangent. The obstruction is a certain homotopy class of the space Y consisting of totally real 3-planes in the Grassmanian of real 3-planes in C3 (=R6). We further compute additional homotopy and homology groups for the space Y and of its complement W consisting of "partially complex" 3-planes in C3.