Add to ORKGConstructs from conformal geometry are important in low dimensional gravity models, while in higher dimensions the higher curvature interactions of Lovelock gravity are similarly prominent. Considering conformal invariance in the context of Lovelock gravity leads to natural, higher-curvature generalizations of the Weyl, Schouten, Cotton and Bach tensors, with properties that straightforwardly extend those of their familiar counterparts. As a first application, we introduce a new set of conformally invariant gravity theories in D=4k dimensions, based on the squares of the higher curvature Weyl tensors
In this thesis we investigate the locally scale-invariant theories of conformal and Weyl quadratic g...
In this paper, we consider a family of n-dimensional, higher-curvature theories of gravity whose act...
International audienceWe consider theories describing the dynamics of a four-dimensional metric, who...
Constructs from conformal geometry are important in low dimensional gravity models, while in higher ...
We develop the properties of Weyl geometry, beginning with a review of the conformal properties of R...
In this paper, we consider a family of n-dimensional, higher-curvature theories of gravity whose act...
In order to study the properties of Lovelock gravity theories in low dimensions, we define the kth-o...
The gravity theory given by the Einstein-Hilbert action has a natural extension in higher dimensions...
Conformal transformations are frequently used tools in order to study relations between various theo...
We discuss the conditions under which classically conformally invariant models in four dimensions ca...
In this thesis we investigate necessary and su±cient conditions for an n-dimensional space, n ≥ 4, t...
It is well known that Einstein gravity is kinematic (meaning that there is no non-trivial vacuum sol...
We investigate the coupling of matter to geometry in conformal quadratic Weyl gravity, by assuming a...
We present a Born–Infeld gravity theory based on generalizations of Maxwell symmetries denoted as Cm...
Abstract We introduce an extension of the Standard Model and General Relativity built upon the princ...
In this thesis we investigate the locally scale-invariant theories of conformal and Weyl quadratic g...
In this paper, we consider a family of n-dimensional, higher-curvature theories of gravity whose act...
International audienceWe consider theories describing the dynamics of a four-dimensional metric, who...
Constructs from conformal geometry are important in low dimensional gravity models, while in higher ...
We develop the properties of Weyl geometry, beginning with a review of the conformal properties of R...
In this paper, we consider a family of n-dimensional, higher-curvature theories of gravity whose act...
In order to study the properties of Lovelock gravity theories in low dimensions, we define the kth-o...
The gravity theory given by the Einstein-Hilbert action has a natural extension in higher dimensions...
Conformal transformations are frequently used tools in order to study relations between various theo...
We discuss the conditions under which classically conformally invariant models in four dimensions ca...
In this thesis we investigate necessary and su±cient conditions for an n-dimensional space, n ≥ 4, t...
It is well known that Einstein gravity is kinematic (meaning that there is no non-trivial vacuum sol...
We investigate the coupling of matter to geometry in conformal quadratic Weyl gravity, by assuming a...
We present a Born–Infeld gravity theory based on generalizations of Maxwell symmetries denoted as Cm...
Abstract We introduce an extension of the Standard Model and General Relativity built upon the princ...
In this thesis we investigate the locally scale-invariant theories of conformal and Weyl quadratic g...
In this paper, we consider a family of n-dimensional, higher-curvature theories of gravity whose act...
International audienceWe consider theories describing the dynamics of a four-dimensional metric, who...