Reverse Faber-Krahn inequality for a truncated laplacian operator

Abstract

In this paper we prove a reverse Faber-Krahn inequality for the principal eigenvalue μ1() of the fully nonlinear eigenvalue problem \[ eq \arrayr c l l -λN(D2 u) & = & μ u & in , \\ u & = & 0 & on ∂ . array. \] Here λN(D2 u) stands for the largest eigenvalue of the Hessian matrix of u. More precisely, we prove that, for an open, bounded, convex domain ⊂ RN, the inequality \[ μ1() ≤ π2[diam()]2 = μ1(Bdiam()/2),\] where diam() is the diameter of , holds true. The inequality actually implies a stronger result, namely, the maximality of the ball under a diameter constraint. Furthermore, we discuss the minimization of μ1() under different kinds of constraints.