The Keller-Osserman problem for the k-Hessian operator
Analysis of PDEs
2019-08-05 v4
Abstract
A delicate problem is to obtain existence of solutions to the boundary blow-up elliptic equation% \begin{equation*} \sigma _{k}^{1/k}\left( \lambda \left( D^{2}u\right) \right) =g\left( u\right) \text{ in }\Omega \text{, }\underset{x\rightarrow x_{0}}{\lim }% u\left( x\right) =+\infty \text{ }\forall x_{0}\in \partial \Omega \text{,} \end{equation*}% where is the -Hessian operator and is a smooth bounded domain. Our goal is to provide a necessary and sufficient condition on to ensure existence of at least one positive blow-up solution. The main tools for proving existence are the comparison principle and the method of sub and supersolutions.
Keywords
Cite
@article{arxiv.1508.04653,
title = {The Keller-Osserman problem for the k-Hessian operator},
author = {Dragos-Patru Covei},
journal= {arXiv preprint arXiv:1508.04653},
year = {2019}
}