On the resonant Lane-Emden problem for the p-Laplacian

Abstract

We study the positive solutions of the Lane-Emden equation -pu=λp|u|q-2u in with homogeneous Dirichlet boundary conditions, where ⊂RN is a bounded and smooth domain, N≥2, λp is the first eigenvalue of the p-Laplacian operator p and q is close to p>1. We prove that any family of positive solutions of this problem converges in C1() to the function θpep when q→ p, where ep is the positive and L∞-normalized first eigenfunction of the p-Laplacian and θp:=(|ep|Lp()-p∫ep% p| ep|dx). A consequence of this result is that the best constant of the immersion W01,p() Lq() is differentiable at q=p. Previous results on the asymptotic behavior (as q→ p) of the positive solutions of the non-resonant Lane-Emden problem (i.e. with λp replaced by a positive λ≠λp) are also generalized to the space C1% () and to arbitrary families of these solutions. Moreover, if uλ,q denotes a solution of the non-resonant problem for an arbitrarily fixed λ>0, we show how to obtain the first eigenpair of the p-Laplacian as the limit in C1(), when q→ p, of a suitable scaling of the pair (λ,uλ,q). For computational purposes the advantage of this approach is that λ does not need to be close to λp. Finally, an explicit estimate involving L∞ and L1 norms of uλ,q is also deduced using set level techniques.