A Dimension-Free Hermite-Hadamard Inequality via Gradient Estimates for the Torsion Function

Abstract

Let ⊂ Rn be a convex domain and let f: → R be a subharmonic function, f ≥ 0, which satisfies f ≥ 0 on the boundary ∂ . Then ∫f ~dx ≤ ||1n ∫∂ f ~dσ. Our proof is based on a new gradient estimate for the torsion function, u = -1 with Dirichlet boundary conditions, which is of independent interest.