summary:We study relations between functions on the cotangent bundle of a spacetime which are constants of motion for geodesics and functions on the odd-dimensional phase space conserved by the Reeb vector fields of geometrical structures generated by the metric and an electromagnetic field
[No abstract available]722293319Anderson, J.L., (1967) Principles of Relativity Physics, , Academic ...
We study the conservation laws associated with the asymptotic Poincare symmetry of spacetime in the ...
International audienceInternational Letters of Chemistry, Physics and Astronomy (Volume 83): Equatio...
summary:We study relations between functions on the cotangent bundle of a spacetime which are consta...
summary:The phase space of general relativistic test particle is defined as the 1-jet space of motio...
We discuss the physics of interacting fields and particles living in a de Sitter Lorentzian manifold...
The phase space of general relativistic test particle is defined as the 1-jet space of motions. A Lo...
For a field theory that is invariant under diffeomorphisms there is a subtle interplay between symme...
For a field theory that is invariant under diffeomorphisms there is a subtle interplay between symme...
International audienceGiven a vector field on a manifold M , we define a globally conserved quantity...
In Schwarzschild spacetime, the timelike geodesic equations, which define particle orbits, have a we...
We discuss conservation laws for gravity theories invariant under general coordinate and local Loren...
We show that the conservation laws for the geodesic equation which are associated to affine symmetri...
To serve as a dispersion relation, a cotangent bundle function must satisfy three simple algebraic p...
The phase space of relativistic particle mechanics is defined as the first jet space of motions rega...
[No abstract available]722293319Anderson, J.L., (1967) Principles of Relativity Physics, , Academic ...
We study the conservation laws associated with the asymptotic Poincare symmetry of spacetime in the ...
International audienceInternational Letters of Chemistry, Physics and Astronomy (Volume 83): Equatio...
summary:We study relations between functions on the cotangent bundle of a spacetime which are consta...
summary:The phase space of general relativistic test particle is defined as the 1-jet space of motio...
We discuss the physics of interacting fields and particles living in a de Sitter Lorentzian manifold...
The phase space of general relativistic test particle is defined as the 1-jet space of motions. A Lo...
For a field theory that is invariant under diffeomorphisms there is a subtle interplay between symme...
For a field theory that is invariant under diffeomorphisms there is a subtle interplay between symme...
International audienceGiven a vector field on a manifold M , we define a globally conserved quantity...
In Schwarzschild spacetime, the timelike geodesic equations, which define particle orbits, have a we...
We discuss conservation laws for gravity theories invariant under general coordinate and local Loren...
We show that the conservation laws for the geodesic equation which are associated to affine symmetri...
To serve as a dispersion relation, a cotangent bundle function must satisfy three simple algebraic p...
The phase space of relativistic particle mechanics is defined as the first jet space of motions rega...
[No abstract available]722293319Anderson, J.L., (1967) Principles of Relativity Physics, , Academic ...
We study the conservation laws associated with the asymptotic Poincare symmetry of spacetime in the ...
International audienceInternational Letters of Chemistry, Physics and Astronomy (Volume 83): Equatio...
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