Differential inclusions for the Schouten tensor and nonlinear eigenvalue problems in conformal geometry
Abstract
Let be a smooth Riemannian metric on a closed manifold of dimension . We study the existence of a smooth metric conformal to whose Schouten tensor satisfies the differential inclusion on , where is a cone satisfying standard assumptions. Inclusions of this type are often assumed in the existence theory for fully nonlinear elliptic equations in conformal geometry. We assume the existence of a continuous metric conformal to satisfying in the viscosity sense on , together with a nondegenerate ellipticity condition, where or is a cone slightly smaller than . In fact, we prove not only the existence of metrics satisfying such differential inclusions, but also existence and uniqueness results for fully nonlinear eigenvalue problems for the Schouten tensor. We also give a number of geometric applications of our results. We show that the solvability of the -Yamabe problem is equivalent to positivity of a nonlinear eigenvalue for the -operator in three dimensions. We also give a generalisation of a theorem of Aubin and Ehrlick on pinching of the Ricci curvature, and an application in the study of Green's functions for fully nonlinear Yamabe problems.
Cite
@article{arxiv.2208.00523,
title = {Differential inclusions for the Schouten tensor and nonlinear eigenvalue problems in conformal geometry},
author = {Jonah A. J. Duncan and Luc Nguyen},
journal= {arXiv preprint arXiv:2208.00523},
year = {2022}
}