Solutions of Elliptic Equations ΔU+K(x)e2u=f(x)

Author(s)

Abstract

In this paper we consider the elliptic equation Δu + K(x)e^{2u} = f(x), which arises from prescribed curvature problem in Riemannian geometry. It is proved that if K(x) is negative and continuous in R², then for any f ∈ L²_{loc} (R²) such that f(x) ≤ K(x), the equation possesses a positive solution. A uniqueness theorem is also given.

Keywords:

elliptic equations;prescribed curvature problem;monotone operators;Kato's inequality
About this article

Abstract View

  • 157

Pdf View

  • 54

How to Cite

Solutions of Elliptic Equations ΔU+K(x)e2u=f(x). (1991). Journal of Partial Differential Equations, 4(2), 36-44. https://www.global-sci.com/index.php/jpde/article/view/3678