Multiplicity of bounded solutions to the k-Hessian equation with a Matukuma-type source

Abstract

The aim of this paper is to deal with the k-Hessian counterpart of the Laplace equation involving a nonlinearity studied by Matukuma. Namely, our model is the problem equation* (1)\;\;\;cases Sk(D2u)= λ |x|μ-2(1+|x|2)μ2 (1-u)q &in \;\; B,\\ u <0 & in \;\; B,\\ u=0 &on ∂ B, cases equation* where B denotes the unit ball in Rn,n>2k (k∈N), λ>0 is an additional parameter, q>k and μ≥ 2. In this setting, through a transformation recently introduced by two of the authors that reduces problem (1) to a non-autonomous two-dimensional generalized Lotka-Volterra system, we prove the existence and multiplicity of solutions for the above problem combining dynamical-systems tools, the intersection number between a regular and a singular solution and the super and subsolution method.