Multi-bubble nodal solutions to slightly subcritical elliptic problems with Hardy terms in symmetric domains

Abstract

We consider the slightly subcritical elliptic problem with Hardy term \ aligned - u-μu|x|2 &= |u|2-2-εu && in ⊂RN, \\\ u &= 0&& on ∂ , aligned . where 0∈ and is invariant under the subgroup SO(2)×\ EN-2\⊂ O(N); here En denots the n× n identity matrix. If μ=μ0εα with μ0>0 fixed and α>N-4N-2 the existence of nodal solutions that blow up, as ε0+, positively at the origin and negatively at a different point in a general bounded domain has been proved in BarGuo-ANS. Solutions with more than two blow-up points have not been found so far. In the present paper we obtain the existence of nodal solutions with a positive blow-up point at the origin and k=2 or k=3 negative blow-up points placed symmetrically in (R2×\0\) around the origin provided a certain function fk:R+×R+× I has stable critical points; here I=\t>0:(t,0,…,0)∈\. If =B(0,1)⊂RN is the unit ball centered at the origin we obtain two solutions for k=2 and N7, or k=3 and N large. The result is optimal in the sense that for =B(0,1) there cannot exist solutions with a positive blow-up point at the origin and four negative blow-up points placed on the vertices of a square centered at the origin. Surprisingly there do exist solutions on =B(0,1) with a positive blow-up point at the origin and four blow-up points on the vertices of a square with alternating positive and negative signs. The results of our paper show that the structure of the set of blow-up solutions of the above problem offers fascinating features and is not well understood.