Uniqueness Theorems for fully nonlinear conformal equations on subdomains of the sphere
Abstract
In this paper we prove classification results to elliptic fully nonlinear conformal equations on certain subdomains of the sphere with prescribed constant mean curvature on its boundary. Such subdomains are the hemisphere (or a geodesic ball on Sn) of dimension n≥ 2 with prescribed constant mean curvature on its boundary, and annular domains with minimal boundary. Our results extend the classifications of Escobar in E0 when n≥ 3, and Hang-Wang in HaWa and Jimenez in J when n=2.
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