Sign-Changing Solutions for Critical Equations with Hardy Potential

Abstract

We consider the following perturbed critical Dirichlet problem involving the Hardy-Schr\"odinger operator on a smooth bounded domain ⊂ RN, N≥ 3, with 0 ∈ : \ arrayll- u-γ u|x|2-ε u=|u|4N-2u &in u=0 & on ∂ , array. when ε>0 is small and γ< (N-2)24. Setting γj= (N-2)24(1-j(N-2+j)N-1)∈(-∞,0] for j ∈ N, we show that if γ≤ (N-2)24-1 and γ ≠ γj for any j, then for small ε, the above equation has a positive --non variational-- solution that develops a bubble at the origin. If moreover γ<(N-2)24-4, then for any integer k ≥ 2, the equation has for small enough ε, a sign-changing solution that develops into a superposition of k bubbles with alternating sign centered at the origin. The above result is optimal in the radial case, where the condition that γ≠ γj is not necessary. Indeed, it is known that, if γ > (N-2)24-1 and is a ball B, then there is no radial positive solution for ε>0 small. We complete the picture here by showing that, if γ≥ (N-2)24-4, then the above problem has no radial sign-changing solutions for ε>0 small. These results recover and improve what is known in the non-singular case, i.e., when γ=0.