Gravitoelectromagnetism: Difference between revisions

Browse history interactively ← Previous edit Next edit →Content deleted Content addedVisual WikitextInline

Revision as of 03:30, 20 May 2012 edit70.109.177.148 (talk) →Lorentz force: I don't get "accelerated" and "inertial" describing the same test particle.← Previous edit		Revision as of 08:50, 21 May 2012 edit undoJRSpriggs (talk \| contribs)Autopatrolled, Extended confirmed users, Pending changes reviewers18,799 edits →Lorentz force: simplify expression for the acceleration, see talk page for more details on the calculation.Next edit →
(2 intermediate revisions by the same user not shown)
Line 115:		Line 115:
	\|<math> \nabla \times \mathbf{E} = -\frac{\partial \mathbf{B} } {\partial t} \ </math>		\|<math> \nabla \times \mathbf{E} = -\frac{\partial \mathbf{B} } {\partial t} \ </math>
	\|-		\|-
	\|<math> \nabla \times \mathbf{B}_\text{g} = -\frac{4 \pi G}{c^2} \mathbf{J}_\text{g} + \frac{1}{c^2} \frac{\partial \mathbf{E}_\text{g}} {\partial t} </math>		\|<math> \nabla \times \mathbf{B}_\text{g} = 4 \left( -\frac{4 \pi G}{c^2} \mathbf{J}_\text{g} + \frac{1}{c^2} \frac{\partial \mathbf{E}_\text{g}} {\partial t} \right) </math>
	\|<math> \nabla \times \mathbf{B} = \frac{1}{\epsilon_0 c^2} \mathbf{J} + \frac{1}{c^2} \frac{\partial \mathbf{E}} {\partial t} </math>		\|<math> \nabla \times \mathbf{B} = \frac{1}{\epsilon_0 c^2} \mathbf{J} + \frac{1}{c^2} \frac{\partial \mathbf{E}} {\partial t} </math>
	\|}		\|}
Line 139:		Line 139:
	!EM equation		!EM equation
	\|-		\|-
	\|<math>\mathbf{F} = m \left( \mathbf{E}_\text{g} + \mathbf{v} \times 4 \mathbf{B}_\text{g} \right) </math>		\|<math>\mathbf{F} = m \left( \mathbf{E}_\text{g} + \mathbf{v} \times 2 \mathbf{B}_\text{g} \right) </math>
	\|<math>\mathbf{F} = q \left( \mathbf{E} + \mathbf{v} \times \mathbf{B} \right) </math>		\|<math>\mathbf{F} = q \left( \mathbf{E} + \mathbf{v} \times \mathbf{B} \right) </math>
	\|-		\|-
Line 145:		Line 145:

	where:		where:
	* ''m'' is the ] of the ];		* ''m'' is the ] of the ];
	* ''q'' is the ] of the ];		* ''q'' is the ] of the ];
	* '''v''' is the ] of the test particle.		* '''v''' is the ] of the test particle.

	The acceleration of ~~the~~ test particle is ~~simply~~:		The acceleration of a ]ing test particle is:
	:<math>\mathbf{a} = \mathbf{E}_\text{g} + \mathbf{v} \times 4 \mathbf{B}_\text{g} </math>.		:<math> \mathbf{a} = \mathbf{E}_\text{g} + \mathbf{v} \times 2 \mathbf{B}_\text{g} - \frac{ ( \mathbf{E}_\text{g} \cdot \mathbf{v} ) \mathbf{v} }{c^2} \,.</math>
			where extra term is due to the effect of differentiating <math>\gamma = \frac{1}{\sqrt{1-\frac{v^2}{c^2}}} \,,</math> see ].
	<!-- comment out Poynting vector since it is not within the range of valid approximation, see talk page		<!-- comment out Poynting vector since it is not within the range of valid approximation, see talk page
	===Poynting vector===		===Poynting vector===

Revision as of 08:50, 21 May 2012

This article is about the gravitational analog of electromagnetism as a whole. For the specific gravitational analog of magnetism, see frame-dragging.

Gravitoelectromagnetism, abbreviated GEM, refers to a set of formal analogies between the equations for electromagnetism and relativistic gravitation; specifically: between Maxwell's field equations and an approximation, valid under certain conditions, to the Einstein field equations for general relativity. The most common version of GEM is valid only far from isolated sources, and for slowly moving test particles.

The analogy and equations were first published in 1893, before general relativity, by Oliver Heaviside as a separate theory expanding Newton's law, differing essentially only by some small factors.

Background

Gravitomagnetism - Gravitomagnetic field due to angular momentum. (L = angular momentum and H = gravitomagnetic field strength).

Electromagnetism - Magnetic field due to a dipole moment...

...or equivalently current, same field profile, and field generation due to rotation. (B = magnetic induction field, I = current, m = magnetic dipole moment).

Fluid mechanics - Rotational fluid drag of a solid sphere immersed in fluid, analogous directions and senses of rotation as magnetism, analogous interaction to frame dragging for the gravitomagnetic interaction.Physical analogues of fields

This approximate reformulation of gravitation as described by general relativity in the weak field limit makes an apparent field appear in a frame of reference different from that of a freely moving inertial body. This apparent field may be described by two components that act respectively like the electric and magnetic fields of electromagnetism, and by analogy these are called the gravitoelectric and gravitomagnetic fields, since these arise in the same way around a mass that a moving electric charge is the source of electric and magnetic fields. The main consequence of the gravitomagnetic field, or velocity-dependent acceleration, is that a moving object near a rotating massive object will experience acceleration not predicted by a purely Newtonian (gravitoelectric) gravity field. More subtle predictions, such as induced rotation of a falling object and precession of a spinning object are among the last basic predictions of general relativity to be directly tested.

Indirect validations of gravitomagnetic effects have been derived from analyses of relativistic jets. Roger Penrose had proposed a frame dragging mechanism for extracting energy and momentum from rotating black holes. Reva Kay Williams, University of Florida, developed a rigorous proof that validated Penrose's mechanism. Her model showed how the Lense–Thirring effect could account for the observed high energies and luminosities of quasars and active galactic nuclei; the collimated jets about their polar axis; and the asymmetrical jets (relative to the orbital plane). All of those observed properties could be explained in terms of gravitomagnetic effects. Williams’ application of Penrose's mechanism can be applied to black holes of any size. Relativistic jets can serve as the largest and brightest form of validations for gravitomagnetism.

A group at Stanford University is currently analyzing data from the first direct test of GEM, the Gravity Probe B satellite experiment, to see if they are consistent with gravitomagnetism. The Apache Point Observatory Lunar Laser-ranging Operation also plans to observe gravitomagnetism effects.

Equations

According to general relativity, the gravitational field produced by a rotating object (or any rotating mass–energy) can, in a particular limiting case, be described by equations that have the same form as in classical electromagnetism. Starting from the basic equation of general relativity, the Einstein field equation, and assuming a weak gravitational field or reasonably flat spacetime, the gravitational analogs to Maxwell's equations for electromagnetism, called the "GEM equations", can be derived. GEM equations compared to Maxwell's equations in SI units are:

GEM equations	Maxwell's equations
$\nabla \cdot \mathbf {E} _{\text{g}}=-4\pi G\rho _{\text{g}}\$	$\nabla \cdot \mathbf {E} ={\frac {\rho }{\epsilon _{0}}}$
$\nabla \cdot \mathbf {B} _{\text{g}}=0\$	$\nabla \cdot \mathbf {B} =0\$
$\nabla \times \mathbf {E} _{\text{g}}=-{\frac {\partial \mathbf {B} _{\text{g}}}{\partial t}}\$	$\nabla \times \mathbf {E} =-{\frac {\partial \mathbf {B} }{\partial t}}\$
$\nabla \times \mathbf {B} _{\text{g}}=4\left(-{\frac {4\pi G}{c^{2}}}\mathbf {J} _{\text{g}}+{\frac {1}{c^{2}}}{\frac {\partial \mathbf {E} _{\text{g}}}{\partial t}}\right)$	$\nabla \times \mathbf {B} ={\frac {1}{\epsilon _{0}c^{2}}}\mathbf {J} +{\frac {1}{c^{2}}}{\frac {\partial \mathbf {E} }{\partial t}}$

where:

E_g is the static gravitational field (conventional gravity, also called gravitoelectric in analogous usage) in m/s;
E is the electric field;
B_g is the gravitomagnetic field in 1/s;
B is the magnetic field;
ρ_g is mass density in kg/m;
ρ is charge density:
J_g is mass current density (J_g = ρ_g v_ρ, where v_ρ is the velocity of the mass flow generating the gravitomagnetic field) in kg/m·s;
J is electric current density;
G is the gravitational constant in m/kg·s;
ε₀ is the vacuum permittivity;
c is the speed of propagation of gravity (which is equal to the speed of light according to general relativity) in m/s.

Lorentz force

For a test particle whose mass m is "small", in a stationary system, the net (Lorentz) force acting on it due to a GEM field is described by the following GEM analog to the Lorentz force equation:

GEM equation	EM equation
$\mathbf {F} =m\left(\mathbf {E} _{\text{g}}+\mathbf {v} \times 2\mathbf {B} _{\text{g}}\right)$	$\mathbf {F} =q\left(\mathbf {E} +\mathbf {v} \times \mathbf {B} \right)$

where:

m is the relativistic mass of the test particle;
q is the electric charge of the test particle;
v is the velocity of the test particle.

The acceleration of a free falling test particle is:

\mathbf {a} =\mathbf {E} _{\text{g}}+\mathbf {v} \times 2\mathbf {B} _{\text{g}}-{\frac {(\mathbf {E} _{\text{g}}\cdot \mathbf {v} )\mathbf {v} }{c^{2}}}\,.

where extra term is due to the effect of differentiating $\gamma ={\frac {1}{\sqrt {1-{\frac {v^{2}}{c^{2}}}}}}\,,$ see special relativity#Force.

Scaling of fields

The literature does not adopt a consistent scaling for the gravitoelectric and gravitomagnetic fields, making comparison tricky. For example, to obtain agreement with Mashhoon's writings, all instances of B_g in the GEM equations must be multiplied by −1/2c and E_g by −1. These factors variously modify the analogues of the equations for the Lorentz force. No scaling choice allows all the GEM and EM equations to be perfectly analogous. The discrepancy in the factors arises because the source of the gravitational field is the second order stress–energy tensor, as opposed to the source of the electromagnetic field being the first order four-current tensor. This difference becomes clearer when one compares non-invariance of relativistic mass to electric charge invariance. This can be traced back to the spin-2 character of the gravitational field, in contrast to the electromagnetism being a spin-1 field.

In Planck units

From comparison of GEM equations and Maxwell's equations it is obvious that −1/(4πG) is the gravitational analog of vacuum permittivity ε₀. Adopting Planck units normalizes G, c and 1/(4πε₀) to 1, thereby eliminating these constants from both sets of equations. The two sets of equations then become identical but for the minus sign preceding 4π in the GEM equations. These minus signs stem from an essential difference between gravity and electromagnetism: electrostatic charges of identical sign repel each other, while masses attract each other. Hence the GEM equations are simply Maxwell's equations with mass (or mass density) substituting for charge (or charge density), and −G replacing the Coulomb force constant 1/(4πε₀).

The following table summarizes the results thus far:

Common Structure of the Maxwell and

GEM Equations Given Planck units.

\nabla \cdot \mathbf {E} =\iota 4\pi \rho

$\nabla \cdot \mathbf {B} =0$

$\nabla \times \mathbf {E} =-\partial \mathbf {B} /\partial t$

$\nabla \times \mathbf {B} =\iota 4\pi \mathbf {J} +\partial \mathbf {E} /\partial t$

ι = +1 (Maxwell) or −1 (GEM).

4π appears in both the GEM and Maxwell equations, because Planck units normalize G and 1/(4πε₀) to 1, and not 4πG and 1/ε₀.

Higher-order effects

Some higher-order gravitomagnetic effects can reproduce effects reminiscent of the interactions of more conventional polarized charges. For instance, if two wheels are spun on a common axis, the mutual gravitational attraction between the two wheels will be greater if they spin in opposite directions than in the same direction. This can be expressed as an attractive or repulsive gravitomagnetic component.

Gravitomagnetic arguments also predict that a flexible or fluid toroidal mass undergoing minor axis rotational acceleration (accelerating "smoke ring" rotation) will tend to pull matter through the throat (a case of rotational frame dragging, acting through the throat). In theory, this configuration might be used for accelerating objects (through the throat) without such objects experiencing any g-forces.

Consider a toroidal mass with two degrees of rotation (both major axis and minor-axis spin, both turning inside out and revolving). This represents a "special case" in which gravitomagnetic effects generate a chiral corkscrew-like gravitational field around the object. The reaction forces to dragging at the inner and outer equators would normally be expected to be equal and opposite in magnitude and direction respectively in the simpler case involving only minor-axis spin. When both rotations are applied simultaneously, these two sets of reaction forces can be said to occur at different depths in a radial Coriolis field that extends across the rotating torus, making it more difficult to establish that cancellation is complete.

Modelling this complex behaviour as a curved spacetime problem has yet to be done and is believed to be very difficult.

Gravitomagnetic fields of astronomical objects

The formula for the gravitomagnetic field B_g near a rotating body can be derived from the GEM equations. It is given by:

\mathbf {B} _{\text{g}}={\frac {G}{2c^{2}}}{\frac {\mathbf {L} -3(\mathbf {L} \cdot \mathbf {r} /r)\mathbf {r} /r}{r^{3}}},

where L is the angular momentum of the body. At the equatorial plane, r and L are perpendicular, so their dot product vanishes, and this formula reduces to:

\mathbf {B} _{\text{g}}={\frac {G}{2c^{2}}}{\frac {\mathbf {L} }{r^{3}}},

The magnitude of angular momentum of a homogeneous ball-shaped body is:

L=I_{\text{ball}}\omega ={\frac {2mr^{2}}{5}}{\frac {2\pi }{T}}

where:

$I_{\text{ball}}={\frac {2mr^{2}}{5}}$ is the moment of inertia of a ball-shaped body (see: list of moments of inertia);
$\omega \$ is the angular velocity;
m is the mass;
r is the radius;
T is the rotational period.

Earth

Therefore, the magnitude of Earth's gravitomagnetic field at its equator is:

B_{\text{g, Earth}}={\frac {G}{5c^{2}}}{\frac {m}{r}}{\frac {2\pi }{T}}={\frac {2\pi rg}{5c^{2}T}},

where $g=G{\frac {m}{r^{2}}}$ is Earth's gravity. The force direction coincides with the angular moment direction, i.e. north.

From this calculation it follows that Earth's equatorial gravitomagnetic field is about 1.012×10 Hz, or 3.1×10 in units of standard gravity (9.81 m/s) divided by the speed of light. Such a field is extremely weak and requires extremely sensitive measurements to be detected. One experiment to measure such field was the Gravity Probe B mission.

Pulsar

If the preceding formula is used with the second fastest-spinning pulsar known, PSR J1748-2446ad (which rotates 716 times per second), assuming a radius of 16 km, and two solar masses, then

B_{\text{g}}={\frac {2\pi Gm}{5rc^{2}T}}

equals about 166 Hz. This would be easy to notice. However, the pulsar is spinning at a quarter of the speed of light at the equator, and its radius is only three times more than its Schwarzschild radius. When such fast motion and such strong gravitational fields exist in a system, the simplified approach of separating gravitomagnetic and gravitoelectric forces can be applied only as a very rough approximation.

Lack of invariance

While Maxwell's equations are invariant under Lorentz transformations, the GEM equations are not. The most obvious difficulty is the factor of 4 in the force law. However, the fact that ρ_g and j_g do not form a four-vector (instead they are merely a part of the stress–energy tensor) is a more fundamental problem. Consequently, although GEM may hold approximately in two different reference frames connected by a Lorentz boost, there is no way to calculate the GEM variables of one such frame from the GEM variables of the other, unlike the situation with the variables of electromagnetism. Indeed, their predictions (about what motion is free fall) will probably conflict with each other.

Note that the GEM equations are invariant under translations and spatial rotations, just not under boosts and more general curvilinear transformations. Maxwell's equations can be formulated in a way that makes them invariant under all of these coordinate transformations.

Fringe physics

Incomplete understanding of the meaning of the similarity of the gravitomagnetic formulas, above, and Maxwell's equations for (real) electricity and magnetism have given rise to fringe physics. Use of the gravitomagnetic analogy for a simplified form of the Einstein field equations, on the other hand, is firmly part of General Relativity. It is an approximation to the current standard theory of gravitation, and has testable predictions, which are in the final stages of being directly tested by the Gravity Probe B experiment. Despite the use of the word magnetism in gravitomagnetism, and despite the similarity of the GEM force laws to the (real) electromagnetic force law, gravitomagnetism should not be confused with any of the following:

Claims to have constructed anti-gravity devices
Eugene Podkletnov's claims to have constructed "gravity-shielding devices" and "gravitational reflection beams"
Any proposal to produce gravitation using electrical circuits

References

O. Heaviside (1893). "A gravitational and electromagnetic analogy". The Electrician. 31: 81–82.
Gravitation and Inertia, I. Ciufolini and J.A. Wheeler, Princeton Physics Series, 1995, ISBN 0-691-03323-4
R. Penrose (1969). "Gravitational collapse: The role of general relativity". Rivista de Nuovo Cimento, Numero Speciale. 1: 252–276. Bibcode:1969NCimR...1..252P.
R.K. Williams (1995). "Extracting x rays, Ύ rays, and relativistic ee pairs from supermassive Kerr black holes using the Penrose mechanism". Physical Review. 51 (10): 5387–5427. Bibcode:1995PhRvD..51.5387W. doi:10.1103/PhysRevD.51.5387.
R.K. Williams (2004). "Collimated escaping vortical polar ee jets intrinsically produced by rotating black holes and Penrose processes". The Astrophysical Journal. 611 (2): 952–963. arXiv:astro-ph/0404135. Bibcode:2004ApJ...611..952W. doi:10.1086/422304.
R.K. Williams (2005). "Gravitomagnetic field and Penrose scattering processes". Annals of the New York Academy of Sciences. Vol. 1045. pp. 232–245. {{cite conference}}: Unknown parameter |booktitle= ignored (|book-title= suggested) (help)
R.K. Williams (2001). "Collimated energy-momentum extraction from rotating black holes in quasars and microquasars using the Penrose mechanism". AIP Conference Proceedings. Vol. 586. pp. 448–453. {{cite conference}}: Unknown parameter |arXiv= ignored (|arxiv= suggested) (help)
B. Mashhoon, F. Gronwald, H.I.M. Lichtenegger (1999). "Gravitomagnetism and the Clock Effect". Lect.Notes Phys. 562: 83–108. arXiv:gr-qc/9912027. Bibcode:2001LNP...562...83M.{{cite journal}}: CS1 maint: multiple names: authors list (link)
S.J. Clark, R.W. Tucker (2000). "Gauge symmetry and gravito-electromagnetism". Classical and Quantum Gravity. 17 (19): 4125–4157. arXiv:gr-qc/0003115. Bibcode:2000CQGra..17.4125C. doi:10.1088/0264-9381/17/19/311.
B. Mashhoon (2000). "Gravitoelectromagnetism". arXiv:gr-qc/0011014. {{cite journal}}: Cite journal requires |journal= (help)
R.L. Forward (1963). "Guidelines to Antigravity". American Journal of Physics. 31 (3): 166–170. Bibcode:1963AmJPh..31..166F. doi:10.1119/1.1969340.
http://www.google.com/search?q=2*pi*radius+of+Earth*earth+gravity%2F(5*c^2*day)

External links

Gravity Probe B: Testing Einstein's Universe
Gyroscopic Superconducting Gravitomagnetic Effects news on tentative result of European Space Agency (esa) research
In Search of gravitomagnetism, NASA, 20 April 2004.
Gravitomagnetic London Moment-New test of General Relativity?
Measurement of Gravitomagnetic and Acceleration Fields Around Rotating Superconductors M. Tajmar, et al., 17 October 2006.
Test of the Lense-Thirring effect with the MGS Mars probe, New Scientist, January 2007.

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	Poincaré gauge theory Einstein–Cartan Teleparallelism Bimetric theories Gauge theory gravity 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 Degenerate Higher-Order Scalar-Tensor theories
Quantum-mechanical	Euclidean quantum gravity Canonical quantum gravity Wheeler–DeWitt equation Loop quantum gravity Spin foam Causal dynamical triangulation Asymptotic safety in quantum gravity Causal sets DGP model Rainbow gravity theory
Unified-field-theoric	Kaluza–Klein theory 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

Misplaced Pages