Add to ORKGWe prove that for any vacuum, maximal, asymptotically flat, axisymmetric initial data for Einstein equations close to extreme Kerr data, the inequality \sqrt{J} \leq m is satisfied, where m and J are the total mass and angular momentum of the data. The proof consists in showing that extreme Kerr is a local minimum of the mass
We give a comprehensive discussion, including a detailed proof, of the area-angular momentum-charge ...
International audienceWe show that the area-angular-momentum inequality A>=8pi|J| holds for axially ...
Stationary, axisymmetric, vacuum, solutions of Einstein's equations are obtained as critical points ...
We prove that for any vacuum, maximal, asymptotically flat, axisymmetric initial data for Einstein e...
We prove that for any vacuum, maximal, asymptotically flat, axisymmetric initial data for Einstein e...
The inequality $\sqrt{J}\leq m$ is proved for vacuum, asymptotically flat, maximal and axisymmetric ...
The inequality sqrt(J)<=m is proved for vacuum, asymptotically flat, maximal, and axisymmetric data ...
We prove that an extreme Kerr initial data set is a unique absolute minimum of the total mass in a (...
In this essay I first discuss the physical relevance of the inequality for axially symmetric (nonsta...
We prove the local inequality $A \geq 8\pi|J|$, where $A$ and $J$ are the area and angular momentum ...
In this essay I first discuss the physical relevance of the inequality m ≥p|J | for axially symmetri...
We prove that for sub-extremal axisymmetric and stationary black holes with arbitrary surrounding ma...
We give a comprehensive discussion, including a detailed proof, of the area–angular momentum–charge ...
We prove an inequality between horizon area and angular momentum for a class of axially symmetric bl...
For a stable marginally outer trapped surface (MOTS) in an axially symmetric spacetime with cosmolog...
We give a comprehensive discussion, including a detailed proof, of the area-angular momentum-charge ...
International audienceWe show that the area-angular-momentum inequality A>=8pi|J| holds for axially ...
Stationary, axisymmetric, vacuum, solutions of Einstein's equations are obtained as critical points ...
We prove that for any vacuum, maximal, asymptotically flat, axisymmetric initial data for Einstein e...
We prove that for any vacuum, maximal, asymptotically flat, axisymmetric initial data for Einstein e...
The inequality $\sqrt{J}\leq m$ is proved for vacuum, asymptotically flat, maximal and axisymmetric ...
The inequality sqrt(J)<=m is proved for vacuum, asymptotically flat, maximal, and axisymmetric data ...
We prove that an extreme Kerr initial data set is a unique absolute minimum of the total mass in a (...
In this essay I first discuss the physical relevance of the inequality for axially symmetric (nonsta...
We prove the local inequality $A \geq 8\pi|J|$, where $A$ and $J$ are the area and angular momentum ...
In this essay I first discuss the physical relevance of the inequality m ≥p|J | for axially symmetri...
We prove that for sub-extremal axisymmetric and stationary black holes with arbitrary surrounding ma...
We give a comprehensive discussion, including a detailed proof, of the area–angular momentum–charge ...
We prove an inequality between horizon area and angular momentum for a class of axially symmetric bl...
For a stable marginally outer trapped surface (MOTS) in an axially symmetric spacetime with cosmolog...
We give a comprehensive discussion, including a detailed proof, of the area-angular momentum-charge ...
International audienceWe show that the area-angular-momentum inequality A>=8pi|J| holds for axially ...
Stationary, axisymmetric, vacuum, solutions of Einstein's equations are obtained as critical points ...