Julien Cortier scite author profile

We construct a Kruskal-Szekeres-type analytic extension of the Emparan-Reall black ring, and investigate its geometry. We prove that the extension is maximal, globally hyperbolic, and unique within a natural class of extensions. The key to those results is the proof that causal geodesics are either complete, or approach a singular boundary in finite affine time. Alternative maximal analytic extensions are also constructed.

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Gluing Construction of Initial Data with Kerr–de Sitter Ends

Cortier

2012

Ann. Henri Poincaré

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We construct initial data sets which satisfy the vacuum constraint equations of General Relativity with positive cosmologigal constant. More presilely, we deform initial data with ends asymptotic to Schwarzschild-de Sitter to obtain non-trivial initial data with exactly Kerr-de Sitter ends. The method is inspired from Corvino's gluing method. We obtain here a extension of a previous result for the time-symmetric case by Chruściel and Pollack in [10]. *

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On the Center of Mass of Asymptotically Hyperbolic Initial Data Sets

Cederbaum

Cortier

Sakovich

2015

Ann. Henri Poincaré

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We define the (total) center of mass for suitably asymptotically hyperbolic time-slices of asymptotically anti-de Sitter spacetimes in general relativity. We do so in analogy to the picture that has been consolidated for the (total) center of mass of suitably asymptotically Euclidean time-slices of asymptotically Minkowskian spacetimes (isolated systems). In particular, we unite-an altered version of-the approach based on Hamiltonian charges with an approach based on CMC-foliations near infinity. The newly defined center of mass transforms appropriately under changes of the asymptotic coordinates and evolves in the direction of an appropriately defined linear momentum under the Einstein evolution equations.

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Julien Cortier

On the global structure of the Pomeransky–Senkov black holes

Maximal analytic extensions of the Emparan-Reall black ring

Maximal analytic extensions of the Emparan-Reall black ring

Gluing Construction of Initial Data with Kerr–de Sitter Ends

On the Center of Mass of Asymptotically Hyperbolic Initial Data Sets

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