Positive entire solutions of semilinear elliptic equations with quadratically vanishing coefficient

We establish that for n 3 and p>1, the elliptic equation Δu+K(x)up=0 in Rn possesses a continuum of positive entire solutions with logarithmic decay at ∞, provided that a locally Hölder continuous function K 0 in Rn {0}, satisfies K(x)=O(xσ) at x=0 for some σ>−2, and x2K(x)=c+O([logx]−θ) near ∞ for some constants c>0 and θ>1. The continuum contains at least countably many solutions among which any two do not intersect. This is an affirmative answer to an open question raised in [S. Bae, T.K. Chang, On a class of semilinear elliptic equations in Rn, J. Differential Equations 185 (2002) 225–250]. The crucial observation is that in the radial case of K(r)=K(x), two fundamental weights, and , appear in analyzing the asymptotic behavior of solutions.