Conformally bending three-manifolds with boundary

Matthew J. Gursky, Jeffrey Streets, Micah Warren

Type: Article

Publication Date: 2010-01-01

Citations: 1

DOI: https://doi.org/10.5802/aif.2613

Abstract

Given a three-dimensional manifold with boundary, the Cartan-Hadamard theorem implies that there are obstructions to filling the interior of the manifold with a complete metric of negative curvature. In this paper, we show that any three-dimensional manifold with boundary can be filled conformally with a complete metric satisfying a pinching condition: given any small constant, the ratio of the largest sectional curvature to (the absolute value of) the scalar curvature is less than this constant. This condition roughly means that the curvature is “almost negative”, in a scale-invariant sense.

Locations

French digital mathematics library (Numdam) - View - PDF
Annales de l’institut Fourier - View - PDF

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+ PDF Chat	Complete conformal metrics with negative scalar curvature in compact Riemannian manifolds	1988	Patricio Avilés Robert McOwen
+	Classical solutions of fully nonlinear, convex, second‐order elliptic equations	1982	Lawrence C. Evans
+	BOUNDEDLY NONHOMOGENEOUS ELLIPTIC AND PARABOLIC EQUATIONS IN A DOMAIN	1984	Н. В. Крылов
+ PDF Chat	Existence of complete conformal metrics of negative Ricci curvature on manifolds with boundary	2010	Matthew J. Gursky Jeffrey Streets Micah Warren
+	Courbure presque négative en dimension 3	1987	Christophe Bavard
+	On the almost negatively curved 3-sphere	1988	Peter Buser Detlef Gromoll