English

Differential inclusions for the Schouten tensor and nonlinear eigenvalue problems in conformal geometry

Analysis of PDEs 2022-08-02 v1 Differential Geometry

Abstract

Let g0g_0 be a smooth Riemannian metric on a closed manifold MnM^n of dimension n3n\geq 3. We study the existence of a smooth metric gg conformal to g0g_0 whose Schouten tensor AgA_g satisfies the differential inclusion λ(g1Ag)Γ\lambda(g^{-1}A_g)\in\Gamma on MnM^n, where ΓRn\Gamma\subset\mathbb{R}^n 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 g1g_1 conformal to g0g_0 satisfying λ(g11Ag1)Γˉ\lambda(g_1^{-1}A_{g_1})\in\bar{\Gamma'} in the viscosity sense on MnM^n, together with a nondegenerate ellipticity condition, where Γ=Γ\Gamma' = \Gamma or Γ\Gamma' is a cone slightly smaller than Γ\Gamma. 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 σ2\sigma_2-Yamabe problem is equivalent to positivity of a nonlinear eigenvalue for the σ2\sigma_2-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.

Keywords

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}
}
R2 v1 2026-06-25T01:21:55.447Z