Abstract We show that the Kerr–Schild ansatz can be extended from the metric to the tetrad, and then to teleparallel gravity where curvature vanishes but torsion does not. We derive the equations of motion for the Kerr–Schild null vector, and describe the solution for a rotating black hole in this framework. It is shown that the solution depends on the chosen tetrad in a non-trivial way if the spin connection is fixed to be the one of the flat background spacetime. We show furthermore that any Kerr–Schild solution with a flat background is also a solution of $$f({\mathcal {T}})$$ f ( T ) gravity
We discuss a gauge invariant gravity model in a non-Riemannian geometry in which the curvature and t...
We systematically study the field equations of f (Q) gravity for spherically symmetric and stationar...
In addition to the Kerr metric with cosmological constant ∧ several other metrics are presented givi...
Null tetrads are shown to be a valuable tool in teleparallel theories of modified gravity. We use th...
The scalar tensor theory of gravitation is constructed in D dimensions in all possible geometries of...
This paper builds up the necessary physical groundwork and motivates the derivation of the weak-fiel...
Abstract We examine various methods of constructing conserved quantities in the Teleparallel Equival...
A non-diagonal vielbein ansatz is applied to the N-dimension field equations of f(T) gravity. An ana...
Teleparallel gravity models, in which the curvature and the nonmetricity of spacetime are both set z...
We find exact solutions for f(T) teleparallel gravity for the cases of spherically and cylindrically...
A new exact solution describing a general stationary and axisymmetric object of the gravitational fi...
We construct a theory in which the gravitational interaction is described only by torsion, but that ...
We study various forms of diagonal tetrads that accommodate Black Hole solutions in f(T) gravity wit...
We derive an exact radiating Kerr–Newman like black hole solution, with constant curvature R=R 0 imp...
As a consequence of Birkhoff's theorem, the exterior gravitational field of a spherically symmetric ...
We discuss a gauge invariant gravity model in a non-Riemannian geometry in which the curvature and t...
We systematically study the field equations of f (Q) gravity for spherically symmetric and stationar...
In addition to the Kerr metric with cosmological constant ∧ several other metrics are presented givi...
Null tetrads are shown to be a valuable tool in teleparallel theories of modified gravity. We use th...
The scalar tensor theory of gravitation is constructed in D dimensions in all possible geometries of...
This paper builds up the necessary physical groundwork and motivates the derivation of the weak-fiel...
Abstract We examine various methods of constructing conserved quantities in the Teleparallel Equival...
A non-diagonal vielbein ansatz is applied to the N-dimension field equations of f(T) gravity. An ana...
Teleparallel gravity models, in which the curvature and the nonmetricity of spacetime are both set z...
We find exact solutions for f(T) teleparallel gravity for the cases of spherically and cylindrically...
A new exact solution describing a general stationary and axisymmetric object of the gravitational fi...
We construct a theory in which the gravitational interaction is described only by torsion, but that ...
We study various forms of diagonal tetrads that accommodate Black Hole solutions in f(T) gravity wit...
We derive an exact radiating Kerr–Newman like black hole solution, with constant curvature R=R 0 imp...
As a consequence of Birkhoff's theorem, the exterior gravitational field of a spherically symmetric ...
We discuss a gauge invariant gravity model in a non-Riemannian geometry in which the curvature and t...
We systematically study the field equations of f (Q) gravity for spherically symmetric and stationar...
In addition to the Kerr metric with cosmological constant ∧ several other metrics are presented givi...