On minimal higher genus fillings
Abstract
In this article, we prove that if (M,g) is a genus G orientable surface with a single boundary component S1, and if (D,g0) is a disc such that interior points are connected by unique geodesics and d(D,g0)(x,y) ≥ d(M,g)(x,y) for all x,y ∈ ∂ M = ∂ D, then (1 + 2 Gπ) Area(M,g) ≥ Area(D,g0).
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