Add to ORKGWe develop a new approach to the conformal geometry of embedded hypersurfaces by treating them as conformal infinities of conformally compact manifolds. This involves the Loewner--Nirenberg-type problem of finding on the interior a metric that is both conformally compact and of constant scalar curvature. Our first result is an asymptotic solution to all orders. This involves log terms. We show that the coefficient of the first of these is a new hypersurface conformal invariant which generalises to higher dimensions the important Willmore invariant of embedded surfaces. We call this the obstruction density. For even dimensional hypersurfaces it is a fundamental curvature invarian...
For a hypersurface in a conformal manifold, by following the idea of Fefferman and Graham's work, we...
In this dissertation, we prove a number of results regarding the conformal method of finding solutio...
We examine the space of conformally compact metrics g on the interior of a compact manifold with bou...
The Yamabe problem is that of finding a metric with constant scalar cur-vature conformal to a given ...
The invariant theory for conformal hypersurfaces is studied by treating these as the confor...
The relationship between the boundary of a manifold and its interior is important for studying many ...
Our first objective in this paper is to give a natural formulation of the Christof-fel problem for h...
We consider the problem of finding on a given Euclidean domain Ω of dimension n≥3 a complete c...
A fundamental result in two-dimensional Riemannian geometry is the uniformization theorem, which ass...
We develop a universal distributional calculus for regulated volumes of metrics that are si...
The Willmore energy, alias bending energy or rigid string action, and its variation-the Wil...
A well-known open question in differential geometry is the question of whether a given compact Riema...
The Yamabe Problem asks when the conformal class of a compact, Riemannian manifold (M, g) contains a...
In this paper we obtain first a gap theorem for a class of conformally compact Einstein manifolds wi...
Hermann Weyl's classical invariant theory has been instrumental in the study of myriad geometrical s...
For a hypersurface in a conformal manifold, by following the idea of Fefferman and Graham's work, we...
In this dissertation, we prove a number of results regarding the conformal method of finding solutio...
We examine the space of conformally compact metrics g on the interior of a compact manifold with bou...
The Yamabe problem is that of finding a metric with constant scalar cur-vature conformal to a given ...
The invariant theory for conformal hypersurfaces is studied by treating these as the confor...
The relationship between the boundary of a manifold and its interior is important for studying many ...
Our first objective in this paper is to give a natural formulation of the Christof-fel problem for h...
We consider the problem of finding on a given Euclidean domain Ω of dimension n≥3 a complete c...
A fundamental result in two-dimensional Riemannian geometry is the uniformization theorem, which ass...
We develop a universal distributional calculus for regulated volumes of metrics that are si...
The Willmore energy, alias bending energy or rigid string action, and its variation-the Wil...
A well-known open question in differential geometry is the question of whether a given compact Riema...
The Yamabe Problem asks when the conformal class of a compact, Riemannian manifold (M, g) contains a...
In this paper we obtain first a gap theorem for a class of conformally compact Einstein manifolds wi...
Hermann Weyl's classical invariant theory has been instrumental in the study of myriad geometrical s...
For a hypersurface in a conformal manifold, by following the idea of Fefferman and Graham's work, we...
In this dissertation, we prove a number of results regarding the conformal method of finding solutio...
We examine the space of conformally compact metrics g on the interior of a compact manifold with bou...