An inequality for the normal derivative of the Lane-Emden ground state

Abstract

We consider Lane-Emden ground states with polytropic index 0≤ q-1≤ 1, that is, minimizers of the Dirichlet integral among Lq-normalized functions. Our main result is a sharp lower bound on the L2-norm of the normal derivative in terms of the energy, which implies a corresponding isoperimetric inequality. Our bound holds for arbitrary bounded open Lipschitz sets ⊂Rd, without assuming convexity.