The Willmore Energy Landscape of Spheres and Avoidable Singularities of the Willmore Flow

Abstract

We study the sublevel sets of the Willmore energy on the space of smoothly immersed 2 -spheres in Euclidean 3 -space. We show that the subset of immersions with energy at most 12π consists of four regular homotopy classes. Moreover, we show that in certain regular homotopy classes, all singularities of the Willmore flow are avoidable, that is, the initial surface admits a regular homotopy to a round sphere whose Willmore energy does not exceed that of the initial surface. This yields a classification of initial surfaces with energy at most 12π that lead to unavoidable singularities. As a further consequence, we obtain an extension of the Li-Yau inequality at 12π for a large class of immersed spheres without triple points. To prove these results, we glue together different instances of the Willmore flow and employ an invariant for triple-point-free immersed spheres.