Improved Bounds for Hermite-Hadamard Inequalities in Higher Dimensions

Abstract

Let ⊂ Rn be a convex domain and let f: → R be a positive, subharmonic function (i.e. f ≥ 0). Then 1|| ∫f dx ≤ cn |∂ | ∫∂ f dσ, where cn ≤ 2n3/2. This inequality was previously only known for convex functions with a much larger constant. We also show that the optimal constant satisfies cn ≥ n-1. As a byproduct, we establish a sharp geometric inequality for two convex domains where one contains the other 2 ⊂ 1 ⊂ Rn: |∂ 1||1| | 2||∂ 2| ≤ n.