Existence and nonexistence of least energy solutions of the Neumann problem for a semilinear elliptic equation with critical Sobolev exponent and a critical lower-order perturbation

Abstract

Let be a smooth bounded domain in RN, with N≥ 5, a>0, α≥ 0 and 2*=2NN-2. We show that the the exponent q=2(N-1)N-2 plays a critical role regarding the existence of least energy (or ground state) solutions of the Neumann problem \arrayll - u+au=u2*-1-α uq-1&in\ ,\\ u>0&in\ ,\\ ∂ u∂=0&on\ ∂. array. Namely, we prove that when q=2(N-1)N-2 there exists an α0>0 such that the problem has a least energy solution if α<α0 and has no least energy solution if α>α0.