Jump to content

Fractal cosmology

From Wikipedia, the free encyclopedia

In physical cosmology, fractal cosmology is a set of minority cosmological theories which state that the distribution of matter in the Universe, or the structure of the universe itself, is a fractal across a wide range of scales (see also: multifractal system). More generally, it relates to the usage or appearance of fractals in the study of the universe and matter. A central issue in this field is the fractal dimension of the universe or of matter distribution within it, when measured at very large or very small scales.[1]

Fractals in observational cosmology

[edit]

The first attempt to model the distribution of galaxies with a fractal pattern was made by Luciano Pietronero and his team in 1987,[2] and a more detailed view of the universe's large-scale structure emerged over the following decade, as the number of cataloged galaxies grew larger. Pietronero argues that the universe shows a definite fractal aspect over a fairly wide range of scale, with a fractal dimension of about 2.[3] The fractal dimension of a homogeneous 3D object would be 3, and 2 for a homogeneous surface, whilst the fractal dimension for a fractal surface is between 2 and 3.

The universe has been observed to be homogeneous and isotropic (i.e. is smoothly distributed) at very large scales, as is expected in a standard Big Bang or Friedmann-Lemaître-Robertson-Walker cosmology, and in most interpretations of the Lambda-Cold Dark Matter model. The scientific consensus interpretation is that the Sloan Digital Sky Survey (SDSS) suggests that things do indeed smooth out above 100 Megaparsecs.

One study of the SDSS data in 2004 found "The power spectrum is not well-characterized by a single power law but unambiguously shows curvature ... thereby driving yet another nail into the coffin of the fractal universe hypothesis and any other models predicting a power-law power spectrum".[4] Another analysis of luminous red galaxies (LRGs) in the SDSS data calculated the fractal dimension of galaxy distribution (on a scales from 70 to 100 Mpc/h) at 3, consistent with homogeneity, but that the fractal dimension is 2 "out to roughly 20 h−1 Mpc".[5] In 2012, Scrimgeour et al. definitively showed that large-scale structure of galaxies was homogeneous beyond a scale around 70 Mpc/h.[6]

Fractals in theoretical cosmology

[edit]

In the realm of theory, the first appearance of fractals in cosmology was likely with Andrei Linde's "Eternally Existing Self-Reproducing Chaotic Inflationary Universe"[7] theory (see chaotic inflation theory) in 1986. In this theory, the evolution of a scalar field creates peaks that become nucleation points that cause inflating patches of space to develop into "bubble universes," making the universe fractal on the very largest scales. Alan Guth's 2007 paper on "Eternal Inflation and its implications"[8] shows that this variety of inflationary universe theory is still being seriously considered today. Inflation, in some form or another, is widely considered to be our best available cosmological model.

Since 1986, quite a large number of different cosmological theories exhibiting fractal properties have been proposed. While Linde's theory shows fractality at scales likely larger than the observable universe, theories like causal dynamical triangulation[9] and the asymptotic safety approach to quantum gravity[10] are fractal at the opposite extreme, in the realm of the ultra-small near the Planck scale. These recent theories of quantum gravity describe a fractal structure for spacetime itself, and suggest that the dimensionality of space evolves with time. Specifically, they suggest that reality is 2D at the Planck scale, and that spacetime gradually becomes 4D at larger scales.

French mathematician Alain Connes has been working for a number of years to reconcile general relativity with quantum mechanics using noncommutative geometry. Fractality also arises in this approach to quantum gravity. An article by Alexander Hellemans in the August 2006 issue of Scientific American[11] quotes Connes as saying that the next important step toward this goal is to "try to understand how space with fractional dimensions couples with gravitation." The work of Connes and physicist Carlo Rovelli[12] suggests that time is an emergent property or arises naturally in this formulation, whereas in causal dynamical triangulation[9] choosing those configurations where adjacent building blocks share the same direction in time is an essential part of the "recipe." Both approaches suggest that the fabric of space itself is fractal, however.

See also

[edit]

Notes

[edit]
  1. ^ Dickau, Jonathan J. (2009-08-30). "Fractal cosmology". Chaos, Solitons & Fractals. 41 (4): 2103–2105. Bibcode:2009CSF....41.2103D. doi:10.1016/j.chaos.2008.07.056. ISSN 0960-0779.
  2. ^ Pietronero, L. (1987). "The Fractal Structure of the Universe: Correlations of Galaxies and Clusters". Physica A. 144 (2–3): 257–284. Bibcode:1987PhyA..144..257P. doi:10.1016/0378-4371(87)90191-9.
  3. ^ Joyce, M.; Labini, F.S.; Gabrielli, A.; Montouri, M.; Pietronero, L. (2005). "Basic Properties of Galaxy Clustering in the light of recent results from the Sloan Digital Sky Survey". Astronomy and Astrophysics. 443 (11): 11–16. arXiv:astro-ph/0501583. Bibcode:2005A&A...443...11J. doi:10.1051/0004-6361:20053658. S2CID 14466810.
  4. ^ Tegmark; et al. (10 May 2004). "The Three-Dimensional Power Spectrum of Galaxies from the Sloan Digital Sky Survey". The Astrophysical Journal. 606 (2): 702–740. arXiv:astro-ph/0310725. Bibcode:2004ApJ...606..702T. doi:10.1086/382125. S2CID 119399064.
  5. ^ Hogg, David W.; Eisenstein, Daniel J.; Blanton, Michael R.; Bahcall, Neta A.; Brinkmann, J.; Gunn, James E.; Schneider, Donald P. (2005). "Cosmic homogeneity demonstrated with luminous red galaxies". The Astrophysical Journal. 624 (1): 54–58. arXiv:astro-ph/0411197. Bibcode:2005ApJ...624...54H. doi:10.1086/429084. S2CID 15957886.
  6. ^ Scrimgeour, M.; et al. (September 2012). "The WiggleZ Dark Energy Survey: the transition to large-scale cosmic homogeneity". Mon. Not. R. Astron. Soc. 425 (1): 116–134. arXiv:1205.6812. Bibcode:2012MNRAS.425..116S. doi:10.1111/j.1365-2966.2012.21402.x. S2CID 19959072.
  7. ^ Linde, A.D. (August 1986). "Eternally Existing Self-Reproducing Chaotic Inflationary Universe". Physica Scripta. 15: 169–175. Bibcode:1987PhST...15..169L. doi:10.1088/0031-8949/1987/T15/024.
  8. ^ Guth, Alan (22 June 2007). "Eternal inflation and its implications". J. Phys. A: Math. Theor. 40 (25): 6811–6826. arXiv:hep-th/0702178. Bibcode:2007JPhA...40.6811G. doi:10.1088/1751-8113/40/25/S25. S2CID 18669045.
  9. ^ Jump up to: a b Ambjorn, J.; Jurkiewicz, J.; Loll, R. (2005). "Reconstructing the Universe". Phys. Rev. D. 72 (6): 064014. arXiv:hep-th/0505154. Bibcode:2005PhRvD..72f4014A. doi:10.1103/PhysRevD.72.064014. S2CID 119062691.
  10. ^ Lauscher, O.; Reuter, M. (2005). "Asymptotic Safety in Quantum Einstein Gravity": 11260. arXiv:hep-th/0511260. Bibcode:2005hep.th...11260L. {{cite journal}}: Cite journal requires |journal= (help)
  11. ^ Hellemans, Alexander (1 August 2006). "The Geometer of Particle Physics". Scientific American. 295 (2): 36–38. Bibcode:2006SciAm.295b..36H. doi:10.1038/scientificamerican0806-36. PMID 16866285. Retrieved 14 July 2021.
  12. ^ Connes, A.; Rovelli, C. (1994). "Von Neumann Algebra Automorphisms and Time-Thermodynamics Relation". Class. Quantum Grav. 11 (12): 2899–2918. arXiv:gr-qc/9406019. Bibcode:1994CQGra..11.2899C. doi:10.1088/0264-9381/11/12/007. S2CID 16640171.

References

[edit]
  • Rassem, M. and Ahmed E., "On Fractal Cosmology", Astro. Phys. Lett. Commun. (1996), 35, 311.