An Eigenvalue Problem on Negatively Curved Manifolds

Author(s)

Abstract

Consider the eigenvalue problem: Δgu - λKu = 0 \quad in D where D is the unit disc of the complex plane, g is a complete metric conformal to the Poincaré metric on D, and K is the Gaussian curvature. It is shown that if λ > \frac{1}{2} (λ > \frac{1}{4}in the case of K ≤ 0), then the above problem has no positive solutions.

Keywords:

Eigenvalue problem; complete manifolds; negative curvature
About this article

Abstract View

  • 38696

Pdf View

  • 2650

How to Cite

An Eigenvalue Problem on Negatively Curved Manifolds. (2020). Journal of Partial Differential Equations, 4(4), 1-8. https://www.global-sci.com/index.php/jpde/article/view/3691

Most read articles by the same author(s)