A sharp multidimensional Hermite-Hadamard inequality

Abstract

Let ⊂ Rd, d ≥ 2, be a bounded convex domain and f R be a non-negative subharmonic function. In this paper we prove the inequality \[ 1||∫ f(x)\,dx ≤ d|∂|∫∂ f(x)\,dσ(x)\,. \] Equivalently, the result can be stated as a bound for the gradient of the Saint Venant torsion function. Specifically, if ⊂ Rd is a bounded convex domain and u is the solution of - u =1 with homogeneous Dirichlet boundary conditions, then \[ \|∇ u\|L∞() < d|||∂|\,. \] Moreover, both inequalities are sharp in the sense that if the constant d is replaced by something smaller there exist convex domains for which the inequalities fail. This improves upon the recent result that the optimal constant is bounded from above by d3/2 due to Beck et al.