English

An ODE reduction method for the semi-Riemannian Yamabe problem on space forms

Analysis of PDEs 2020-08-18 v1

Abstract

We consider the semi-Riemannian Yamabe type equations of the form u+λu=μup1u on M -\square u + \lambda u = \mu \vert u\vert^{p-1}u\quad\text{ on }M where MM is either the semi-Euclidean space or the pseudosphere of dimension m3m\geq 3, \square is the semi-Riemannian Laplacian in MM, λ0\lambda\geq0, μR{0}\mu\in\mathbb{R}\smallsetminus\{0\} and p>1p>1. Using semi-Riemannian isoparametric functions on MM, we reduce the PDE into a generalized Emden-Fowler ODE of the form w+q(r)w+λw=μwp1w on I, w''+q(r)w'+\lambda w = \mu\vert w\vert^{p-1}w\quad\text{ on } I, where IRI\subset\mathbb{R} is [0,)[0,\infty) or [0,π][0,\pi], q(r)q(r) blows-up at 00 and ww is subject to the natural initial conditions w(0)=0w'(0)=0 in the first case and w(0)=w(π)=0w'(0)=w'(\pi)=0 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.

Keywords

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}
}
R2 v1 2026-06-23T17:53:39.327Z