A Lower Bound on the Self-intersections of Fold Singularities

Abstract

For an oriented surface S, the singular set of a fold map f:S→ R2 is a collection of smooth curves, also known as fold singularities. We construct a sharp lower bound on the number of self-intersections of such fold singularities. This is done by first establishing a sharp lower bound on the number of self-intersections of the boundary of a surface immersed in R2. We then construct a sharp lower bound for the number of self-intersections of the singular set of a simple stable fold map of a surface to R2 by viewing the connected components of the singular set as the boundary components of smaller surface components, and invoking the previously constructed lower bound for the number of self-intersections of an immersed boundary.