Minimality of free-boundary axial hyperplanes in high dimensional circular cones via calibration

Abstract

Consider an (n+1)-dimensional circular cone with opening angle α ∈ (0,π). Using a free-boundary adaptation of the classical calibration method, we prove that, for n ≥ 4, there exists a threshold α(n) ∈ (0,π) such that if α ≥ α(n), that is, the cone is wide enough, the intersection of the cone with an axial hyperplane is area-minimizing with respect to free-boundary variations inside the cone. This provides a counterexample to a recent Vertex-skipping Theorem proved by the author in collaboration with G.P. Leonardi, at least for n≥4.