Monotonicity of the Morse index of radial solutions of the H\'enon equation in dimension two

Abstract

We consider the equation \[ - u = |x|α |u|p-1u, \ \ x ∈ B, \ \ u=0 on \ \ ∂ B, \] where B ⊂ R2 is the unit ball centered at the origin, α ≥0, p>1, and we prove some results on the Morse index of radial solutions. The contribution of this paper is twofold. Firstly, fixed the number of nodal sets n≥1 of the solution uα,n, we prove that the Morse index m(uα,n) is monotone non-decreasing with respect to α. Secondly, we provide a lower bound for the Morse indices m(uα, n), which shows that m(uα, n) +∞ as α + ∞.