Willmore surfaces in spheres via loop groups III: on minimal surfaces in space forms

Abstract

The family of Willmore immersions from a Riemann surface into Sn+2 can be divided naturally into the subfamily of Willmore surfaces conformally equivalent to a minimal surface in n+2 and those which are not conformally equivalent to a minimal surface in n+2. On the level of their conformal Gauss maps into Gr1,3(1,n+3)=SO+(1,n+3)/SO+(1,3)× SO(n) these two classes of Willmore immersions into Sn+2 correspond to conformally harmonic maps for which every image point, considered as a 4-dimensional Lorentzian subspace of 1,n+3, contains a fixed lightlike vector or where it does not contain such a "constant lightlike vector". Using the loop group formalism for the construction of Willmore immersions we characterize in this paper precisely those normalized potentials which correspond to conformally harmonic maps containing a lightlike vector. Since the special form of these potentials can easily be avoided, we also precisely characterize those potentials which produce Willmore immersions into Sn+2 which are not conformal to a minimal surface in n+2. It turns out that our proof also works analogously for minimal immersions into the other space forms.