Free-Boundary Monotonicity for Almost-Minimizers of the Relative Perimeter
Abstract
Let E ⊂ be a local almost-minimizer of the relative perimeter in the open set ⊂ Rn. We prove a free-boundary monotonicity inequality for E at a point x∈ ∂, under a geometric property called ``visibility'', that is required to satisfy in a neighborhood of x. Incidentally, the visibility property is satisfied by a considerably large class of Lipschitz and possibly non-smooth domains. Then, we prove the existence of the density of the relative perimeter of E at x, as well as the fact that any blow-up of E at x is necessarily a perimeter-minimizing cone within the tangent cone to at x.
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