Asymptotic profiles for a nonlinear Kirchhoff equation with combined powers nonlinearity

Abstract

We study asymptotic behavior of positive ground state solutions of the nonlinear Kirchhoff equation -(a+b∫ RN|∇ u|2) u+ λ u= uq-1+ up-1 in \ RN, as λ 0 and λ +∞, where N=3 or N= 4, 2<q p 2*, 2*=2NN-2 is the Sobolev critical exponent, a>0, b 0 are constants and λ>0 is a parameter. In particular, we prove that in the case 2<q<p=2*, as λ 0, after a suitable rescaling the ground state solutions of the problem converge to the unique positive solution of the equation - u+u=uq-1 and as λ +∞, after another rescaling the ground state solutions of the problem converge to a particular solution of the critical Emden-Fowler equation - u=u2*-1. We establish a sharp asymptotic characterisation of such rescalings, which depends in a non-trivial way on the space dimension N=3 and N= 4. We also discuss a connection of our results with a mass constrained problem associated to the Kirchhoff equation with the mass normalization constraint ∫ RN|u|2=c2.

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