On the asymptotics of ground states for a boundary value problem for the equation - Δp u = a|u|q-2u - b|u|γ-2u

Abstract

We study a singularly perturbed Dirichlet problem for the p-Laplacian with competing superlinear terms, \[ - Δp u = a(x)|u|q-2u - b(x)|u|γ-2u, u|∂Ω=0, \] where 1<p<q<γ<p*, a≥ 0, b≥σb>0, and >0 is small. By means of the nonlinear Rayleigh quotient method, we introduce two critical parameter values, * and e*, related respectively to the Nehari manifold and to the zero energy level. We prove the nonexistence of nontrivial weak solutions for >*, and the existence of at least two positive weak solutions for 0<<e*; one of them is a ground state. The main result describes the asymptotic behaviour of ground states as 0+. If, in addition, a≥σa>0, then every family of positive ground states u converges in measure in Ω to the explicit profile \[ u0(x) = (a(x)b(x))1/(γ-q). \] Moreover, \[ u u0 in Lr(Ω), 1 r<γ, \] and \[ u u0 in Lr(Ω), 1<rγ. \]