On uniqueness and nonuniqueness of ancient ovals

Abstract

In this paper, we prove that any nontrivial SO(k )× SO(n+1-k)-symmetric ancient compact noncollapsed solution of the mean curvature flow agrees up to scaling and rigid motion with the O(k)× O(n+1-k)-symmetric ancient ovals constructed by Hershkovits and the second author. This confirms a conjecture by Angenent-Daskalopoulos-Sesum. On the other hand, for every k≥ 2 we also construct a (k-1)-parameter family of uniformly (k+1)-convex ancient ovals that are only Zk2× O(n+1-k)-symmetric. This gives counterexamples to a conjecture of Daskalopoulos.