Closed self-shrinking surfaces in R3 via the torus

Abstract

We construct many closed, embedded mean curvature self-shrinking surfaces g2⊂eqR3 of high genus g=2k, k∈ N. Each of these shrinking solitons has isometry group equal to the dihedral group on 2g elements, and comes from the "gluing", i.e. desingularizing of the singular union, of the two known closed embedded self-shrinkers in R3: The round 2-sphere S2, and Angenent's self-shrinking 2-torus T2 of revolution. This uses the results and methods N. Kapouleas developed for minimal surfaces in Ka97--Ka.