On a critical Kirchhoff problem in high dimensions

Abstract

In this paper, we consider the following Kirchhoff problem \ -(a+b∫|∇ u|2dx) u&= λ uq-1 + μ u2*-1, & in , \\ u&>0,& ,\\ u&=0,& ∂, .(P) where ⊂ N(N≥4) is a bounded domain, 2≤ q<2*, 2*=2NN-2 is the critical Sobolev exponent and a, b, λ, μ are positive parameters. By using the variational method, we obtain some existence and nonexistence results to (P) for all N≥4 with some further conditions on the parameters a, b, λ, μ, which partially improve some known results in the literatures. Furthermore, Our result for N=4 and q>2, together with our previous works HLW15,HLW151, gives an almost positive answer to Neimen's open question [J. Differential Equations, 257 (2014), 1168--1193].