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

Yasuhito Miyamoto; Justino Sánchez; Vicente Vergara

doi:10.4171/rmi/1092

JournalsrmiVol. 35, No. 5pp. 1559–1582

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

Yasuhito Miyamoto
University of Tokyo, Japan
Justino Sánchez
Universidad de La Serena, Chile
Vicente Vergara
Universidad de Concepción, Chile

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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

(1) ⎩ ⎨ ⎧ S_{k} (D^{2} u) = λ \frac{∣ x ∣ ^{μ - 2}}{( 1 + ∣ x ∣ ^{2} ) ^{μ / 2}} (1 - u)^{q} u < 0 u = 0 in B, in B, on \partial B,

where $B$ denotes the unit ball in $R^{n}$ , $n > 2 k$ ( $k \in N$ ), $λ > 0$ is an additional parameter, $q > k$ and $μ \geq 2$ . 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.

Cite this article

Yasuhito Miyamoto, Justino Sánchez, Vicente Vergara, Multiplicity of bounded solutions to the $k$ -Hessian equation with a Matukuma-type source. Rev. Mat. Iberoam. 35 (2019), no. 5, pp. 1559–1582

DOI 10.4171/RMI/1092