The solution gap of the Brezis-Nirenberg problem on the hyperbolic space

Abstract

We consider the positive solutions of the nonlinear eigenvalue problem -Hn u = λ u + up, with p=n+2n-2 and u ∈ H01(), where is a geodesic ball of radius θ1 on Hn. For radial solutions, this equation can be written as an ODE having n as a parameter. In this setting, the problem can be extended to consider real values of n. We show that if 2<n<4 this problem has a unique positive solution if and only if λ∈ (n(n-2)/4 +L*\,,\, λ1). Here L* is the first positive value of L = -(+1) for which a suitably defined associated Legendre function P-α(θ) >0 if 0 < θ<θ1 and P-α(θ1)=0, with α = (2-n)/2.