On the vanishing discount problem from the negative direction
Abstract
It has been proved in [10] that the unique viscosity solution of \begin{equation}\label{abs}\tag{*} \lambda u_\lambda+H(x,d_x u_\lambda)=c(H)\qquad\hbox{in }, \end{equation} uniformly converges, for , to a specific solution of the critical equation where is a closed and connected Riemannian manifold and is the critical value. In this note, we consider the same problem for . In this case, viscosity solutions of equation \eqref{abs} are not unique, in general, so we focus on the asymptotics of the minimal solution of \eqref{abs}. Under the assumption that constant functions are subsolutions of the critical equation, we prove that the also converges to as . Furthermore, we exhibit an example of for which equation \eqref{abs} admits a unique solution for as well.
Keywords
Cite
@article{arxiv.2007.12458,
title = {On the vanishing discount problem from the negative direction},
author = {Andrea Davini and Lin Wang},
journal= {arXiv preprint arXiv:2007.12458},
year = {2023}
}
Comments
14 pages