Existence of a bi-radial sign-changing solution for Hardy-Sobolev-Mazya type equation

Abstract

In this article, we study the following Hardy-Sobolev-Maz'ya type equation: equation - u - μ u|z|2 = |u|q-2u|z|t, u ∈ D1,2 (Rn), equation where x = (y,z) ∈ Rh × Rk = Rn, with n ≥ 5, 2 < k <n, and t = n - (n-2)q2. We establish the existence of a bi-radial sign-changing solution under the assumptions 0 ≤ μ < (k-2)24, \, 2 < q <2* = 2(n-k+1)n-k-1. We approach the problem by lifting it to the hyperbolic setting, leading to the equation: -BN u \, - \, λ u = |u|p-1u, \; u ∈ H1(BN), BN is the hyperbolic ball model. We study the existence of a sign-changing solution with suitable symmetry by constructing an appropriate invariant subspace of H1(BN) and applying the concentration compactness principle, and the corresponding solution of the Hardy-Sobolev-Maz'ya type equation becomes bi-radial under the corresponding isometry.