A peeling theorem for the Weyl tensor in higher dimensional Lorentzian manifolds is presented. We obtain it by generalizing a proof from the four dimensional case. We derive a generic behavior, discuss interesting subcases and retrieve the four dimensional result.Comment: 11 pages, 0 figure
We construct a lower bound of the tensor rank for a new class of tensors, which we call persistent t...
The counting of the dimension of the space of $U(N) \times U(N) \times U(N)$ polynomial invariants o...
We discuss the cosmological evolution of the Weyl conformal geometry and its associated Weyl quadrat...
We demonstrate the ``peeling property'' of the Weyl tensor in higher dimensions in the case of even ...
We discuss the peeling bahaviour of the Weyl tensor near null infinity for an asymptotivally flat hi...
summary:Alignment classification of tensors on Lorentzian manifolds of arbitrary dimension is summar...
The peeling theorem of general relativity predicts that the Weyl curvature scalars Psi_n (n=0...4), ...
We make use of Friedrich's construction of the cylinder at spatial infinity to relate the logarithmi...
This is an author-created, un-copyedited version of an article accepted for publication in Classical...
We refine the null alignment classification of the Weyl tensor of a five-dimensional spacetime. The ...
We explore connections between geometrical properties of null congruences and the algebraic structur...
Algebraic classification of higher dimensional, shear-free, twist-free, expanding (or non-expanding)...
This thesis considers various aspects of general relativity in more than four spacetime dimensions. ...
It was shown by Weyl that the general static axisymmetric solution of the vacuum Einstein equations ...
In this paper we derive the most general curvature squared action coupled to an arbitrary number of ...
We construct a lower bound of the tensor rank for a new class of tensors, which we call persistent t...
The counting of the dimension of the space of $U(N) \times U(N) \times U(N)$ polynomial invariants o...
We discuss the cosmological evolution of the Weyl conformal geometry and its associated Weyl quadrat...
We demonstrate the ``peeling property'' of the Weyl tensor in higher dimensions in the case of even ...
We discuss the peeling bahaviour of the Weyl tensor near null infinity for an asymptotivally flat hi...
summary:Alignment classification of tensors on Lorentzian manifolds of arbitrary dimension is summar...
The peeling theorem of general relativity predicts that the Weyl curvature scalars Psi_n (n=0...4), ...
We make use of Friedrich's construction of the cylinder at spatial infinity to relate the logarithmi...
This is an author-created, un-copyedited version of an article accepted for publication in Classical...
We refine the null alignment classification of the Weyl tensor of a five-dimensional spacetime. The ...
We explore connections between geometrical properties of null congruences and the algebraic structur...
Algebraic classification of higher dimensional, shear-free, twist-free, expanding (or non-expanding)...
This thesis considers various aspects of general relativity in more than four spacetime dimensions. ...
It was shown by Weyl that the general static axisymmetric solution of the vacuum Einstein equations ...
In this paper we derive the most general curvature squared action coupled to an arbitrary number of ...
We construct a lower bound of the tensor rank for a new class of tensors, which we call persistent t...
The counting of the dimension of the space of $U(N) \times U(N) \times U(N)$ polynomial invariants o...
We discuss the cosmological evolution of the Weyl conformal geometry and its associated Weyl quadrat...
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