Nodal bubble tower solutions to slightly subcritical elliptic problems with Hardy terms

Abstract

We study the possible blow-up behavior of solutions to the slightly subcritical elliptic problem with Hardy term \[ \ aligned - u-μu|x|2 &= |u|2-2-u && in , \\\ u &= 0&& on ∂, aligned . \] in a bounded domain ⊂RN (N7) with 0∈, as μ, 0+. In BarGuo-ANS, we obtained the existence of nodal solutions that blow up positively at the origin and negatively at a different point as μ=O(εα) with α>N-4N-2, 0+. Here we prove the existence of nodal bubble tower solutions, i.e.\ superpositions of bubbles of different signs, all blowing up at the origin but with different blow-up order, as μ=O(), 0+.