On n-dimensional complete self-similar solutions to the mean curvature flow in Rn+1 with nonnegative constant scalar curvature

Abstract

As is well known, self-similar solutions to the mean curvature flow, including self-shrinkers, translating solitons and self-expanders, arise naturally in the singularity analysis of the mean curvature flow. Recently, Guo Guo proved that n-dimensional compact self-shrinkers in Rn+1 with scalar curvature bounded from above or below by some constant are isometric to the round sphere Sn(n), which implies that n-dimensional compact self-shrinkers in Rn+1 with constant scalar curvature are isometric to the round sphere Sn(n)(see also Hui1). Complete classifications of n-dimensional translating solitons in Rn+1 with nonnegative constant scalar curvature and of n-dimensional self-expanders in Rn+1 with nonnegative constant scalar curvature were given by Mart\'in, Savas-Halilaj and SmoczykMSS and Ancari and ChengAC, respectively. In this paper we give complete classifications of n-dimensional complete self-shrinkers in Rn+1 with nonnegative constant scalar curvature. We will also give alternative proofs of the classification theorems due to Mart\'in, Savas-Halilaj and Smoczyk MSS and Ancari and ChengAC.