Weierstrass-Kenmotsu representation of Willmore surfaces in spheres

Abstract

A Willmore surface y:M→ Sn+2 has a natural harmonic oriented conformal Gauss map Gry:M→ SO+(1,n+3)/SO(1,3)× SO(n), which maps each point p∈ M to its oriented mean curvature 2-sphere at p. An easy observation shows that all conformal Gauss maps of Willmore surfaces satisfy a restricted nilpotency condition which will be called "strongly conformally harmonic." The goal of this paper is to characterize those strongly conformally harmonic maps from a Riemann surface M to SO+ (1, n + 3)/SO+(1, 3) × SO(n) which are the conformal Gauss maps of some Willmore surface in Sn+2. It turns out that generically the condition of being strongly conformally harmonic suffices to be associated to a Willmore surface. The exceptional case will also be discussed.