Branch points of area-minimizing projective planes

Abstract

Minimal surfaces in a Riemannian manifold Mn are surfaces which are stationary for area: the first variation of area vanishes. In this paper we focus on surfaces of the topological type of the real projective plane P2. We show that a minimal surface f: P2 M3 which has the smallest area, among those mappings which are not homotopic to a constant mapping, is an immersion. That is, f is free of branch points. As a major step toward treating minimal surfaces of the type of the projective plane, we extend the fundamental theorem of branched immersions to the nonorientable case. We also resolve a question on the directions of branch lines posed by Courant in 1950.