Morse index of radial nodal solutions of H\'enon type equations in dimension two

Abstract

We consider non-autonomous semilinear elliptic equations of the type \[ - u = |x|α f(u), \ \ x ∈ , \ \ u=0 on \ \ ∂ , \] where ⊂ R2 is either a ball or an annulus centered at the origin, α >0 and f: R\ → R is C1, β on bounded sets of R. We address the question of estimating the Morse index m(u) of a sign changing radial solution u. We prove that m(u) ≥ 3 for every α>0 and that m(u)≥ α+ 3 if α is even. If f is superlinear the previous estimates become m(u) ≥ n(u)+2 and m(u) ≥ α+ n(u)+2, respectively, where n(u) denotes the number of nodal sets of u, i.e. of connected components of \ x∈ ; u(x) ≠ 0\. Consequently, every least energy nodal solution uα is not radially symmetric and m(uα) → + ∞ as α → + ∞ along the sequence of even exponents α.