Dynamical instability of minimal surfaces at flat singular points

Abstract

Suppose that a countably n-rectifiable set 0 is the support of a multiplicity-one stationary varifold in Rn+1 with a point admitting a flat tangent plane T of density Q ≥ 2. We prove that, under a suitable assumption on the decay rate of the blow-ups of 0 towards T, there exists a non-constant Brakke flow starting with 0. This shows non-uniqueness of Brakke flow under these conditions, and suggests that the stability of a stationary varifold with respect to mean curvature flow may be used to exclude the presence of flat singularities.