An ODE reduction method for the semi-Riemannian Yamabe problem on space forms
Abstract
We consider the semi-Riemannian Yamabe type equations of the form where is either the semi-Euclidean space or the pseudosphere of dimension , is the semi-Riemannian Laplacian in , , and . Using semi-Riemannian isoparametric functions on , we reduce the PDE into a generalized Emden-Fowler ODE of the form where is or , blows-up at and is subject to the natural initial conditions in the first case and in the second. We prove the existence of blowing-up and globally defined solutions to this problem, both positive and sign-changing, inducing solutions to the semi-Riemannian Yamabe type problem with the same qualitative properties, with level and critical sets described in terms of semi-Riemannian isoparametric hypersurfaces and focal varieties. In particular, we prove the existence of sign-changing blowing-up solutions to the semi-Riemannian Yamabe problem in the pseudosphere having a prescribed number of nodal domains.
Cite
@article{arxiv.2008.07041,
title = {An ODE reduction method for the semi-Riemannian Yamabe problem on space forms},
author = {Juan Carlos Fernández and Oscar Palmas},
journal= {arXiv preprint arXiv:2008.07041},
year = {2020}
}