On the Type IIb solutions to mean curvature flow

Abstract

In this paper we study the Type IIb mean curvature flow. We first prove that if the convex entire graph (y,u(|y|)) over Rn, n≥ 2, satisfying there exist positive constants ε, c and N such that u'(r)≥ c rε for r≥ N, the longtime solution to mean curvature flow with initial data (y,u(|y|)) must be Type IIb. We also study the asymptotic behavior of Type IIb mean curvature flow and show that the limit of suitable rescaling sequence for mean-convex Type IIb mean curvature flow satisfying δ-Andrews' noncollapsing condition is translating soliton.