Conformal gravity refers to gravity theories that are invariant under conformal transformations in the Riemannian geometry sense; more accurately, they are invariant under Weyl transformations \( g_{{ab}}\rightarrow \Omega ^{2}(x)g_{{ab}} \) where \( g_{ab} \) is the metric tensor and \( \Omega (x) \) is a function on spacetime.
Weyl-squared theories
The simplest theory in this category has the square of the Weyl tensor as the Lagrangian
\( {\mathcal {S}}=\int {\mathrm {d}}^{4}x{\sqrt {-g}}C_{{abcd}}C^{{abcd}}, \)
where \( C_{{abcd}} \) is the Weyl tensor. This is to be contrasted with the usual Einstein–Hilbert action where the Lagrangian is just the Ricci scalar. The equation of motion upon varying the metric is called the Bach tensor,
\( {\displaystyle 2\,\nabla _{a}\,\nabla _{d}{{C^{a}}_{bc}}^{d}+{{C^{a}}_{bc}}^{d}R_{ad}=0,} \)
where \( R_{ab}\) is the Ricci tensor. Conformally flat metrics are solutions of this equation.
Since these theories lead to fourth-order equations for the fluctuations around a fixed background, they are not manifestly unitary. It has therefore been generally believed that they could not be consistently quantized. This is now disputed.[1]
Four-derivative theories
Conformal gravity is an example of a 4-derivative theory. This means that each term in the wave equation can contain up to four derivatives. There are pros and cons of 4-derivative theories. The pros are that the quantized version of the theory is more convergent and renormalisable. The cons are that there may be issues with causality. A simpler example of a 4-derivative wave equation is the scalar 4-derivative wave equation:
\( {\displaystyle \operatorname {\Box } ^{2}\Phi =0} \)
The solution for this in a central field of force is:
\( \Phi (r)=1-{\frac {2m}{r}}+ar+br^{2} \)
The first two terms are the same as a normal wave equation. Because this equation is a simpler approximation to conformal gravity, m corresponds to the mass of the central source. The last two terms are unique to 4-derivative wave equations. It has been suggested that small values be assigned to them to account for the galactic acceleration constant (also known as dark matter) and the dark energy constant.[2] The solution equivalent to the Schwarzschild solution in general relativity for a spherical source for conformal gravity has a metric with:
\( {\displaystyle \varphi (r)=g^{00}=(1-6bc)^{\frac {1}{2}}-{\frac {2b}{r}}+cr+{\frac {d}{3}}r^{2}} \)
to show the difference between general relativity. 6bc is very small, and so can be ignored. The problem is that now c is the total mass-energy of the source, and b is the integral of density, times the distance to source, squared. So this is a completely different potential from general relativity and not just a small modification.
The main issue with conformal gravity theories, as well as any theory with higher derivatives, is the typical presence of ghosts, which point to instabilities of the quantum version of the theory, although there might be a solution to the ghost problem.[3]
An alternative approach is to consider the gravitational constant as a symmetry broken scalar field, in which case you would consider a small correction to Newtonian gravity like this (where we consider ε {\displaystyle \varepsilon } \varepsilon to be a small correction):
\( {\displaystyle \operatorname {\Box } \Phi +\varepsilon ^{2}\operatorname {\Box } ^{2}\Phi =0} \)
in which case the general solution is the same as the Newtonian case except there can be an additional term:
\( {\displaystyle \Phi =1-{\frac {2m}{r}}\left(1+\alpha \sin \left({\frac {r}{\varepsilon }}+\beta \right)\right)} \)
where there is an additional component varying sinusoidally over space. The wavelength of this variation could be quite large, such as an atomic width. Thus there appear to be several stable potentials around a gravitational force in this model.
Conformal unification to the Standard Model
By adding a suitable gravitational term to the standard model action in curved spacetime, the theory develops a local conformal (Weyl) invariance. The conformal gauge is fixed by choosing a reference mass scale based on the gravitational coupling constant. This approach generates the masses for the vector bosons and matter fields similar to the Higgs mechanism without traditional spontaneous symmetry breaking.[4]
See also
Conformal supergravity
Hoyle–Narlikar theory of gravity
References
Mannheim, Philip D. (2007-07-16). "Conformal Gravity Challenges String Theory". In Arttu Rajantie; Paul Dauncey; Carlo Contaldi; Horace Stoica (eds.). Particles, Strings, and Cosmology: 13th International Symposium on Particles, Strings, and Cosmology, PASCOS 2007. 0707. Imperial College London. p. 2283.arXiv:0707.2283. Bibcode:2007arXiv0707.2283M.
Mannheim, Philip D. (2005-08-01). "Alternatives to Dark Matter and Dark Energy". Prog. Part. Nucl. Phys. 56 (2): 340.arXiv:astro-ph/0505266. Bibcode:2006PrPNP..56..340M. doi:10.1016/j.ppnp.2005.08.001.
Mannheim, Philip D. (2006-09-06). "Solution to the ghost problem in fourth order derivative theories". Found. Phys. 37 (4–5): 532.arXiv:hep-th/0608154. Bibcode:2007FoPh...37..532M. doi:10.1007/s10701-007-9119-7.
Pawlowski, M.; Raczka, R. (1994), "A Unified Conformal Model for Fundamental Interactions without Dynamical Higgs Field", Foundations of Physics, 24 (9): 1305–1327,arXiv:hep-th/9407137, Bibcode:1994FoPh...24.1305P, doi:10.1007/BF02148570
Further reading
E.S. Fradkin and A.A. Tseytlin (1985). "Conformal Supergravity". Phys. Rep. 119 (4–5): 233–362. Bibcode:1985PhR...119..233F. doi:10.1016/0370-1573(85)90138-3.
Falsification of Mannheim's conformal gravity at CERN
Mannheim's rebuttal of above at arXiv.
vte
Theories of gravitation
Standard
Newtonian gravity (NG)
Newton's law of universal gravitation Gauss's law for gravity Poisson's equation for gravity History of gravitational theory
General relativity (GR)
Introduction History Mathematics Exact solutions Resources Tests Post-Newtonian formalism Linearized gravity ADM formalism Gibbons–Hawking–York boundary term
Alternatives to
general relativity
Paradigms
Classical theories of gravitation Quantum gravity Theory of everything
Classical
Einstein–Cartan Bimetric theories Gauge theory gravity Teleparallelism Composite gravity f(R) gravity Infinite derivative gravity Massive gravity Modified Newtonian dynamics, MOND
AQUAL Tensor–vector–scalar Nonsymmetric gravitation Scalar–tensor theories
Brans–Dicke Scalar–tensor–vector Conformal gravity Scalar theories
Nordström Whitehead Geometrodynamics Induced gravity Chameleon Pressuron Degenerate Higher-Order Scalar-Tensor theories
Quantum-mechanical
Unified-field-theoric
Kaluza–Klein theory
Dilaton Supergravity
Unified-field-theoric and
quantum-mechanical
Noncommutative geometry Semiclassical gravity Superfluid vacuum theory
Logarithmic BEC vacuum String theory
M-theory F-theory Heterotic string theory Type I string theory Type 0 string theory Bosonic string theory Type II string theory Little string theory Twistor theory
Twistor string theory
Generalisations /
extensions of GR
Liouville gravity Lovelock theory (2+1)-dimensional topological gravity Gauss–Bonnet gravity Jackiw–Teitelboim gravity
Pre-Newtonian
theories and
toy models
Aristotelian physics CGHS model RST model Mechanical explanations
Fatio–Le Sage Entropic gravity Gravitational interaction of antimatter Physics in the medieval Islamic world Theory of impetus
Related topics
Hellenica World - Scientific Library
Retrieved from "http://en.wikipedia.org/"
All text is available under the terms of the GNU Free Documentation License