Free boundary minimal surfaces of unbounded genus

Abstract

For each integer g≥ 1 we use variational methods to construct in the unit 3-ball B a free boundary minimal surface g of symmetry group Dg+1. For g large, g has three boundary components and genus g. As g→∞ the surfaces g converge as varifolds to the union of the disk and critical catenoid. These examples are the first with genus greater than 1 and were conjectured to exist by Fraser-Schoen. We also construct several new free boundary minimal surfaces in B with the symmetry groups of the cube, tetrahedron and dodecahedron. Finally, we prove that free boundary minimal surfaces isotopic to those of Fraser-Schoen can be constructed variationally using an equivariant min-max procedure. We also prove an ε-regularity theorem for free boundary minimal surfaces in B.