Singularities of mean curvature flow and isoperimetric inequalities in H3

Abstract

In this article, by following the method in PT, combining Willmore energy with isoperimetric inequalities, we construct two examples of singularities under mean curvature flow in H3. More precisely, there exists a torus, which must develop a singularity under MCF before the volume it encloses decreases to zero. There also exists a topological sphere in the shape of a dumbbell, which must develop a singularity in the flow before its area shrinks to zero. Simultaneously, by using the flow, we proved an isoperimetric inequality for some domains in H3.