On the Willmore problem for surfaces with symmetry

Abstract

The Willmore Problem seeks the surface in S3⊂ R4 of a given topological type minimizing the squared-mean-curvature energy W = ∫ |HR4|2 = area + ∫ HS32. The longstanding Willmore Conjecture that the Clifford torus minimizes W among genus-1 surfaces is now a theorem of Marques and Neves [19], but the general conjecture [10] that Lawson's [16] minimal surface g,1⊂ S3 minimizes W among surfaces of genus g>1 remains open. Here we prove this conjecture under the additional assumption that the competitor surfaces M⊂ S3 share the ambient symmetries of g,1. Specifcally, we show each Lawson surface m,k satisfies the analogous W-minimizing property under a somewhat smaller symmetry group Gm,k<SO(4), using a local computation of the orbifold Euler number o(M/Gm,k) to exclude certain intersection patterns of M with the great circles fixed by generators of Gm,k. We also describe a genus 2 example where the Willmore Problem may not be solvable among surfaces with its symmetry.