Existence, multiplicity and classification results for solutions to k-Hessian equations with general weights

Abstract

The aim of this paper is to study negative classical solutions to a k-Hessian equation involving a nonlinearity with a general weight equation Eq:Ma:0 P cases Sk(D2u)= λ (|x|) (1-u)q &in \;\; B,\\ u=0 &on ∂ B. cases equation Here, B denotes the unit ball in Rn\!, n>2k, λ is a positive parameter and q>k with k∈ N. The function r'(r)/(r) satisfies very general conditions in the radial direction r=|x|. We show the existence, nonexistence, and multiplicity of solutions to Problem Eq:Ma:0. The main technique used for the proofs is a phase-plane analysis related to a non-autonomous dynamical system associated to the equation in Eq:Ma:0. Further, using the aforementioned non-autonomous system, we give a comprehensive characterization of P2-, P3+-, P4+-solutions to the related problem equation* cases Sk(D2 w)= (|x|) (-w)q, \\ w<0, cases equation* given on the entire space Rn\!. In particular, we describe new classes of solutions: fast decay P+3-solutions and P4+-solutions.