Existence and uniqueness of singular solutions for elliptic equation on the hyperbolic space

In this article, we consider the following semilinear elliptic equation on the hyperbolic space ΔHⁿu - λu + |u|^p-1u = 0 on Hⁿ n\{Q} where Δ_Hⁿ is the Laplace-Beltrami operator on the hyperbolic space Hⁿ = {(x ₁, · · · x_n, x_n+1)|x ₁² + · · · + x_n ² - x _n+1 ² = -1}, n > 10, p > 1, λ > 0, and Q = (0, · · · 0, 1). We provide the existence and uniqueness of a singular positive "radial" solution of the above equation for big p (greater than the Joseph-Lundgren exponent, which appears if n > 10) as well as its asymptotic behavior.