Glass-like universe: Real-space correlation properties of standard cosmological models
Abstract
After reviewing the basic relevant properties of stationary stochastic processes (SSP), defining basic terms and quantities, we discuss the properties of the so-called Harrison-Zeldovich like spectra. These correlations, usually characterized exclusively in k space [i.e., in terms of power spectra P(k)], are a fundamental feature of all current standard cosmological models. Examining them in real space we note their characteristics to be a negative power law tail ξ(r)~-r-4, and a sub-Poissonian normalized variance in spheres σ2(R)~R-4ln R. We note in particular that this latter behavior is at the limit of the most rapid decay (~R-4) of this quantity possible for any stochastic distribution (continuous or discrete). This very particular characteristic is usually obscured in cosmology by the use of Gaussian spheres. In a simple classification of all SSP into three categories, we highlight with the name ``superhomogeneous'' the properties of the class to which models such as this, with P(0)=0, belong. In statistical physics language they are well described as glass-like. They have neither ``scale-invariant'' features, in the sense of critical phenomena, nor fractal properties. We illustrate their properties with some simple examples, in particular that of a ``shuffled'' lattice.
- Publication:
-
Physical Review D
- Pub Date:
- April 2002
- DOI:
- arXiv:
- arXiv:astro-ph/0110451
- Bibcode:
- 2002PhRvD..65h3523G
- Keywords:
-
- 98.80.-k;
- 05.40.-a;
- Cosmology;
- Fluctuation phenomena random processes noise and Brownian motion;
- Astrophysics;
- Condensed Matter;
- High Energy Physics - Phenomenology
- E-Print:
- 20 pages, 3 postscript figures, corrected some typos and minor changes to match the accepted version in Physical Review D