Hoyle–Narlikar theory of gravity
The Hoyle–Narlikar theory of gravity[1] is a Machian and conformal theory of gravity proposed by Fred Hoyle and Jayant Narlikar that fits into the quasi steady state model of the universe.[2] The gravitational constant G is arbitrary and is determined by the mean density of matter in the universe. The theory was inspired by the Wheeler–Feynman absorber theory for electrodynamics.[3] When Feynman, as a graduate student, lectured on the Wheeler–Feynman absorber theory in the weekly physics seminar at Princeton, Einstein was in the audience and stated at question time that he was trying to achieve the same thing for gravity.[4]
Stephen Hawking showed in 1965 that the theory is incompatible with an expanding universe, because the Wheeler-Feynman advanced solution would diverge.[5] However at that time the accelerating expansion of the universe was not known, which resolves the divergence issue because of the cosmic event horizon. The discovery of the accelerated expansion is fairly recent and it earned the Nobel prize in 2011.[6]
The Hoyle-Narlikar theory reduces to Einstein's general relativity in the limit of a smooth fluid model of particle distribution and a transformation of coordinates into the rest frame of the fluid to simplify the field equations. The two theories make the same predictions and the Hoyle-Narlikar theory has been shown to be correct according to various cosmological tests.[7] However, under the quasi steady state hypothesis, the theory currently does not fit into WMAP data.[8] Narlikar and his followers are working on adding mini bangs with various creation fields to explain the anisotropy of the universe.[9][10] If the creation field (or C-field) is not used, the theory is no longer steady state and agrees with WMAP data.
See also
- Mach's principle
- Conformal gravity
- Wheeler–Feynman absorber theory
- Self-creation cosmology
- Brans–Dicke theory
- Non-standard cosmology
Notes
- ↑ "Cosmology: Math Plus Mach Equals Far-Out Gravity". Time. Jun 26, 1964. Retrieved 7 August 2010.
- ↑ F. Hoyle; J. V. Narlikar (1964). "A New Theory of Gravitation". Proceedings of the Royal Society A. 282: 191–207. Bibcode:1964RSPSA.282..191H. doi:10.1098/rspa.1964.0227.
- ↑ Hoyle, Narlikar (1995). "Cosmology and action-at-a-distance electrodynamics". Reviews of Modern Physics. 67 (1): 113–155. Bibcode:1995RvMP...67..113H. doi:10.1103/RevModPhys.67.113.
- ↑ Feynman, Richard P. (1985). Surely You're Joking, Mr. Feynman!. W. W. Norton & Company. Part II, The Princeton years, pp. 91 et seq. ISBN 978-0393316049.
- ↑ Hawking, S. W. (20 July 1965). "On the Hoyle-Narlikar Theory of Gravitation". Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences. 286 (1406): 313–319. doi:10.1098/rspa.1965.0146.
- ↑ Palmer, Jason (2011-10-04). "Nobel physics prize honours accelerating Universe find". BBC. Retrieved 2011-10-05.
- ↑ Canuto, V. M.; Narlikar, J. V. (15 February 1980). "Cosmological tests of the Hoyle-Narlikar conformal gravity". The Astrophysical Journal. 236: 6–23. doi:10.1086/157714.
- ↑ Edward L. Wright. "Errors in the Steady State and Quasi-SS Models". Retrieved 7 August 2010.
- ↑ J.V. Narlikar; R.G. Vishwakarma; Amir Hajian; Tarun Souradeep; G. Burbidge; F. Hoyle (2002). "Inhomogeneities in the Microwave Background Radiation interpreted within the framework of the Quasi-Steady State Cosmology". Astrophysical Journal. 585: 1–11. arXiv:astro-ph/0211036. Bibcode:2003ApJ...585....1N. doi:10.1086/345928.
- ↑ J. V. Narlikar; N. C. Rana (1983). "Cosmic microwave background spectrum in the Hoyle-Narlikar cosmology". Physics Letters A. 99 (2-3): 75–76. Bibcode:1983PhLA...99...75N. doi:10.1016/0375-9601(83)90927-1.
Bibliography
- Hoyle, Fred; Narlikar, Jayant V.; Freeman, W.H. (1974). Action at a distance in physics and cosmology. W. H. Freeman and Company. ISBN 978-0716703464.
- Hoyle, Fred; Narlikar, Jayant V. (1996). Lectures on Cosmology and Action at a Distance Electrodynamics. World Scientific. ISBN 978-9810225582.
- Hoyle, Fred; Burbidge, Geoffrey; Narlikar, Jayant V. (2000). A Different Approach to Cosmology: From a Static Universe through the Big Bang towards Reality. Cambridge University Press. ISBN 978-0521662239.