Add to ORKGWe consider Bel–Robinson-like higher derivative conserved two-index tensors H_(μν) in simple matter models, following a recently suggested Maxwell field version. In flat space, we show that they are essentially equivalent to the true stress tensors. In curved Ricci-flat backgrounds it is possible to redefine H_(μν) so as to overcome non-commutativity of covariant derivatives, and maintain conservation, but they become model and dimension dependent, and generally lose their simple 'BR' form
Treballs Finals de Grau de Física, Facultat de Física, Universitat de Barcelona, Curs: 2020, Tutor: ...
We clarify the relation among canonical, metric and Belinfante's energy-momentum tensors for general...
We study conformal gravity in d = 2 + 1, where the Cotton tensor is equated to a — necessarily trace...
We consider Bel–Robinson-like higher derivative conserved two-index tensors H_(μν) in simple matter ...
Some unusual relations between stress tensors, conservation and equations of motion are briefly revi...
We construct, and establish the (covariant) conservation of, a 4-index ‘super stress tensor’ for top...
We reconsider the consistency constraints on a free massless symmetric, rank 2, tensor field in a ba...
We reconsider the consistency constraints on a free massless symmetric rank 2 tensor field in a back...
The title's century-old conjecture is established for D = 2 and is likely for all D
We attempt to generalize the familiar covariantly conserved Bel–Robinson tensor B_(μναβ) ~ RR of GR ...
Considered a unified field theory approach describing matter and space (metric tensor) by means of a...
The Bach tensor is classically defined in dimension 4, and work from J. Bergman \cite{bergman:2004} ...
Inspired by classical work of Bel and Robinson, a natural purely algebraic construction of super-ene...
We propose a novel but natural definition of conserved quantities for gravity models quadratic and h...
A new, conserved, symmetric tensor field for a source-free Maxwell test field on a four-dimensional ...
Treballs Finals de Grau de Física, Facultat de Física, Universitat de Barcelona, Curs: 2020, Tutor: ...
We clarify the relation among canonical, metric and Belinfante's energy-momentum tensors for general...
We study conformal gravity in d = 2 + 1, where the Cotton tensor is equated to a — necessarily trace...
We consider Bel–Robinson-like higher derivative conserved two-index tensors H_(μν) in simple matter ...
Some unusual relations between stress tensors, conservation and equations of motion are briefly revi...
We construct, and establish the (covariant) conservation of, a 4-index ‘super stress tensor’ for top...
We reconsider the consistency constraints on a free massless symmetric, rank 2, tensor field in a ba...
We reconsider the consistency constraints on a free massless symmetric rank 2 tensor field in a back...
The title's century-old conjecture is established for D = 2 and is likely for all D
We attempt to generalize the familiar covariantly conserved Bel–Robinson tensor B_(μναβ) ~ RR of GR ...
Considered a unified field theory approach describing matter and space (metric tensor) by means of a...
The Bach tensor is classically defined in dimension 4, and work from J. Bergman \cite{bergman:2004} ...
Inspired by classical work of Bel and Robinson, a natural purely algebraic construction of super-ene...
We propose a novel but natural definition of conserved quantities for gravity models quadratic and h...
A new, conserved, symmetric tensor field for a source-free Maxwell test field on a four-dimensional ...
Treballs Finals de Grau de Física, Facultat de Física, Universitat de Barcelona, Curs: 2020, Tutor: ...
We clarify the relation among canonical, metric and Belinfante's energy-momentum tensors for general...
We study conformal gravity in d = 2 + 1, where the Cotton tensor is equated to a — necessarily trace...