On the behaviour of the first eigenvalue of the p-Laplacian with Robin boundary conditions as p goes to 1

Abstract

In this paper we study the -limit, as p 1, of the functional Jp(u)=∫ |∇ u|p + β∫ ∂ |u|p ∫ |u|p, where is a smooth bounded open set in RN, p>1 and β is a real number. Among our results, for β >-1, we derive an isoperimetric inequality for \[ (,β)=∈fu ∈ BV(), u 0 |Du|() + (β,1)∫ ∂ |u| ∫ |u| \] which is the limit as p 1+ of λ(,p,β)= u∈ W1,p() Jp(u). We show that among all bounded and smooth open sets with given volume, the ball maximizes (, β) when β ∈ (-1,0) and minimizes (, β) when β ∈[0, ∞).

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