Classification of ancient ovals in higher dimensional mean curvature flow

Abstract

We study compact non-selfsimilar ancient noncollapsed solutions to the mean curvature flow in Rn+1, called ancient ovals. Our main result is the classification of k-ovals: any k-oval (characterized by having cylindrical blow down Rk× Sn-k and the quadratic bending asymptotics) belongs, up to space-time rigid motions and parabolic dilations, to the family of ancient ovals constructed by Haslhofer and the second author. Assuming the nonexistence of exotic ovals (recently proved by Bamler-Lai), this yields a classification of all ancient ovals and identifies the moduli space, modulo symmetries, with an open (k-1)-simplex modulo the symmetry of simplex. Although these conclusions are contained in the recent breakthrough of Bamler-Lai classifying all ancient asymptotically cylindrical flows and resolving the mean convex neighborhood conjecture, we give an alternative argument for the independently obtained classification of k-ovals in arbitrary dimensions based on a different spectral parametrization.