On the existence of positive solutions for semilinear elliptic equations in the annulus

Abstract We study the existence of positive radial solutions of Δu+g(|x|) ƒ(u) = 0 in annuli with Dirichlet (Dirichlet/Neumann) boundary conditions. We prove that the problems have positive radial solutions on any annulus if ƒ is sublinear at 0 and ∞.