Uniqueness of boundary tangent cones for 2-dimensional area-minimizing currents
Abstract
In this paper we show that, if T is an area-minimizing 2-dimensional integral current with ∂ T = Q [\![ ]\!], where is a C1,α curve for α>0 and Q an arbitrary integer, then T has a unique tangent cone at every boundary point, with a polynomial convergence rate. The proof is a simple reduction to the case Q=1, studied by Hirsch and Marini.
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