Singular analysis of the optimizers of the principal eigenvalue in indefinite weighted Neumann problems

Abstract

We study the minimization of the positive principal eigenvalue associated to a weighted Neumann problem settled in a bounded smooth domain ⊂ RN, within a suitable class of sign-changing weights. Denoting with u the optimal eigenfunction and with D its super-level set associated to the optimal weight, we perform the analysis of the singular limit of the optimal eigenvalue as the measure of D tends to zero. We show that, when the measure of D is sufficiently small, u has a unique local maximum point lying on the boundary of and D is connected. Furthermore, the boundary of D intersects the boundary of the box , and more precisely, HN-1(∂ D ∂ ) C|D|(N-1)/N for some universal constant C>0. Though widely expected, these properties are still unknown if the measure of D is arbitrary.