Regularity of minimal submanifolds and mean curvature flows with a common free boundary

Abstract

Let N be a smooth (n+l)-dimensional Riemannian manifold. We show that if V is an area-stationary union of three or more C1,μ n-dimensional submanifolds-with-boundary Mk ⊂ N with a common boundary , then is smooth and each Mk is smooth up to (real-analytic in the case N is real-analytic). This extends a previous result of the author for codimension l = 1. We additionally show that if \Vt\t ∈ (-1,1) is a Brakke flow such that each time-slice Vt is a union of three or more n-dimensional submanifolds-with-boundary Mk,t ⊂ N with a common boundary t and with parabolic C2+μ regularity in time-space, then \t\t ∈ (-1,1) and \Mk,t\t ∈ (-1,1) are smooth (second Gevrey with real-analytic time-slices in the case N is real-analytic).