Baryon acoustic oscillations

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In cosmology, baryon acoustic oscillations (BAO) are regular, periodic fluctuations in the density of the visible baryonic matter (normal matter) of the universe. In the same way that supernova provide a "standard candle" for astronomical observations,^[1] BAO matter clustering provides a "standard ruler" for length scale in cosmology.^[2] The length of this standard ruler (~490 million light years in today's universe^[3]) can be measured by looking at the large scale structure of matter using astronomical surveys.^[3] BAO measurements help cosmologists understand more about the nature of dark energy (which causes the apparent slight acceleration of the expansion of the universe) by constraining cosmological parameters.^[2]

The early universe

The early universe consisted of a hot, dense plasma of electrons and baryons (protons and neutrons). Photons (light particles) traveling in this universe were essentially trapped, unable to travel for any considerable distance before interacting with the plasma via Thomson scattering.^[4] As the universe expanded, the plasma cooled to below 3000 K—a low enough energy such that the electrons and protons in the plasma could combine to form neutral hydrogen atoms. This recombination happened when the universe was around 379,000 years old, or at a redshift of z = 1089.^[4] Photons interact to a much lesser degree with neutral matter, and therefore at recombination the universe became transparent to photons, allowing them to decouple from the matter and free-stream through the universe.^[4] Technically speaking, the mean free path of the photons became on the order of the size of the universe. The cosmic microwave background (CMB) radiation is light that was emitted after recombination that is only now reaching our telescopes. Therefore, when we look at Wilkinson Microwave Anisotropy Probe (WMAP) data, we are looking back in time to see an image of the universe when it was only 379,000 years old.^[4]

Figure 1: Temperature anisotropies of the CMB based on the nine year WMAP data (2012).^[5]^[6]^[7]

WMAP indicates (Figure 1) a smooth, homogeneous universe with density anisotropies of 10 parts per million.^[4] However, when we observe the universe today we find large structure and density fluctuations. Galaxies, for instance, are a million times more dense than the universe's mean density.^[2] The current belief is that the universe was built in a bottom-up fashion, meaning that the small anisotropies of the early universe acted as gravitational seeds for the structure we see today. Overdense regions attract more matter, whereas underdense regions attract less, and thus these small anisotropies we see in the CMB became the large scale structures we observe in the universe today.

Cosmic sound

Imagine an overdense region of the primordial plasma. While this region of overdensity gravitationally attracts matter towards it, the heat of photon-matter interactions creates a large amount of outward pressure. These counteracting forces of gravity and pressure created oscillations, analogous to sound waves created in air by pressure differences.^[3]

Consider a single wave originating from this overdense region from the center of the plasma. This region contains dark matter, baryons and photons. The pressure results in a spherical sound wave of both baryons and photons moving with a speed slightly over half the speed of light^[8]^[9] outwards from the overdensity. The dark matter interacts only gravitationally, and so it stays at the center of the sound wave, the origin of the overdensity. Before decoupling, the photons and baryons moved outwards together. After decoupling the photons were no longer interacting with the baryonic matter and they diffused away. That relieved the pressure on the system, leaving behind a shell of baryonic matter at a fixed radius. This radius is often referred to as the sound horizon.^[3] Without the photo-baryon pressure driving the system outwards, the only remaining force on the baryons was gravitational. Therefore, the baryons and dark matter (left behind at the center of the perturbation) formed a configuration which included overdensities of matter both at the original site of the anisotropy and in the shell at the sound horizon for that anisotropy.^[3]

Many such anisotropies created the ripples in the density of space that attracted matter and eventually galaxies formed in a similar pattern. Therefore, one would expect to see a greater number of galaxies separated by the sound horizon than at other length scales.^[3] This particular configuration of matter occurred at each anisotropy in the early universe, and therefore the universe is not composed of one sound ripple,^[10] but many overlapping ripples.^[11] As an analogy, imagine dropping many pebbles into a pond and watching the resulting wave patterns in the water.^[2] It is not possible to observe this preferred separation of galaxies on the sound horizon scale by eye, but one can measure this artifact statistically by looking at the separations of large numbers of galaxies.

Standard ruler

BAO signal in the Sloan Digital Sky Survey

The Sloan Digital Sky Survey (SDSS) is a 2.5-metre wide-angle optical telescope at Apache Point Observatory in New Mexico. The goal of this five-year survey was to take images and spectra of millions of celestial objects. The result of compiling the SDSS data is a three-dimensional map of objects in the nearby universe: the SDSS catalog. The SDSS catalog provides a picture of the distribution of matter in a large enough portion of the universe that one can search for a BAO signal by noting whether there is a statistically significant overabundance of galaxies separated by the predicted sound horizon distance.

The SDSS team looked at a sample of 46,748 luminous red galaxies (LRGs), over 3,816 square-degrees of sky (approximately five billion light years in diameter) and out to a redshift of z = 0.47.^[3] They analyzed the clustering of these galaxies by calculating a two-point correlation function on the data.^[12] The correlation function (ξ) is a function of comoving galaxy separation distance (s) and describes the probability that one galaxy will be found within a given distance of another.^[13] One would expect a high correlation of galaxies at small separation distances (due to the clumpy nature of galaxy formation) and a low correlation at large separation distances. The BAO signal would show up as a bump in the correlation function at a comoving separation equal to the sound horizon. This signal was detected by the SDSS team in 2005.^[3]^[14] SDSS confirmed the WMAP results that the sound horizon is ~7024462851637220078♠150 Mpc in today's universe.^[2]^[3]

Detection in other galaxy surveys

The 2dFGRS collaboration and the SDSS collaboration reported a detection of the BAO signal in the power spectrum at around the same time.^[15] Both teams are credited and recognized for the discovery by the community as evidenced by the prestigious 2014 Shaw Prize in Astronomy which was awarded to both groups. Since then, further detections have been reported in the 6dF Galaxy Survey (6dFGS),^[16] WiggleZ^[17] and BOSS.^[18]

BAO and dark energy formalism

BAO constraints dark energy parameters

The BAO in the radial and tangential directions provide measurements of the Hubble parameter and angular diameter distance, respectively. The angular diameter distance and Hubble parameter can include different functions that explain dark energy behavior.^[19]^[20] These functions have two parameters w₀ and w₁ and one can constrain them with chi-square technique.^[21]

General relativity and dark energy

In general relativity, the expansion of the universe is parametrized by a scale factor $a(t)$ which is related to redshift:^[4]

a(t)\equiv (1+z(t))^{{-1}}\!

The Hubble parameter, $H(z)$ , in terms of the scale factor is:

H(t)\equiv {\frac {{\dot a}}{a}}\!

where ${\dot a}$ is the time-derivative of the scale factor. The Friedmann equations express the expansion of the universe in terms of Newton's gravitational constant, $G_{{N}}$ , the mean gauge pressure, $P$ , the Universe's density $\rho \!$ , the curvature, $k$ , and the cosmological constant, $\Lambda \!$ :^[4]

H^{2}=\left({\frac {{\dot {a}}}{a}}\right)^{2}={\frac {8\pi G}{3}}\rho -{\frac {kc^{2}}{a^{2}}}+{\frac {\Lambda c^{2}}{3}}

{\dot {H}}+H^{2}={\frac {{\ddot {a}}}{a}}=-{\frac {4\pi G}{3}}\left(\rho +{\frac {3p}{c^{2}}}\right)+{\frac {\Lambda c^{2}}{3}}

Observational evidence of the acceleration of the universe implies that (at present time) ${\ddot {a}}>0$ . Therefore, the following are possible explanations:^[22]

The universe is dominated by some field or particle that has negative pressure such that the equation of state:

w={\frac {P}{\rho }}<-1/3\!

There is a non-zero cosmological constant, $\Lambda \!$ .
The Friedmann equations are incorrect since they contain over simplifications in order to make the general relativistic field equations easier to compute.

In order to differentiate between these scenarios, precise measurements of the Hubble parameter as a function of redshift are needed.

Measured observables of dark energy

The density parameter, $\Omega \!$ , of various components, $x$ , of the universe can be expressed as ratios of the density of $x$ to the critical density, $\rho _{c}\!$ :^[22]

\rho _{c}={\frac {3H^{2}}{8\pi G}}

\Omega _{x}\equiv {\frac {\rho _{x}}{\rho _{c}}}={\frac {8\pi G\rho _{x}}{3H^{2}}}

The Friedman equation can be rewritten in terms of the density parameter. For the current prevailing model of the universe, ΛCDM, this equation is as follows:^[22]

H^{2}(a)=\left({\frac {{\dot {a}}}{a}}\right)^{2}=H_{0}^{2}\left[\Omega _{m}a^{{-3}}+\Omega _{r}a^{{-4}}+\Omega _{k}a^{{-2}}+\Omega _{\Lambda }a^{{-3(1+w)}}\right]

where m is matter, r is radiation, k is curvature, Λ is dark energy, and w is the equation of state. Measurements of the CMB from WMAP put tight constraints on many of these parameters; however it is important to confirm and further constrain them using an independent method with different systematics.

The BAO signal is a standard ruler such that the length of the sound horizon can be measured as a function of cosmic time.^[3] This measures two cosmological distances: the Hubble parameter, $H(z)$ , and the angular diameter distance, $d_{A}(z)$ , as a function of redshift $(z)$ .^[23] By measuring the subtended angle, $\Delta \theta$ , of the ruler of length $\Delta \chi$ , these parameters are determined as follows:^[23]

\Delta \theta ={\frac {\Delta \chi }{d_{A}(z)}}\!

d_{A}(z)\propto \int _{{0}}^{{z}}{\frac {dz'}{H(z')}}\!

the redshift interval, $\Delta z$ , can be measured from the data and thus determining the Hubble parameter as a function of redshift:

c\Delta z=H(z)\Delta \chi \!

Therefore, the BAO technique helps constrain cosmological parameters and provide further insight into the nature of dark energy.

References

1 2 Perlmutter, S.; et al. (1999). "Measurements of Ω and Λ from 42 High‐Redshift Supernovae". The Astrophysical Journal. 517 (2): 565. arXiv:astro-ph/9812133. Bibcode:1999ApJ...517..565P. doi:10.1086/307221.
1 2 3 4 5 Eisenstein, D. J. (2005). "Dark energy and cosmic sound". New Astronomy Reviews. 49 (7–9): 360. Bibcode:2005NewAR..49..360E. doi:10.1016/j.newar.2005.08.005.
1 2 3 4 5 6 7 8 9 10 11 12 Eisenstein, D. J.; et al. (2005). "Detection of the Baryon Acoustic Peak in the Large‐Scale Correlation Function of SDSS Luminous Red Galaxies". The Astrophysical Journal. 633 (2): 560. arXiv:astro-ph/0501171. Bibcode:2005ApJ...633..560E. doi:10.1086/466512.
1 2 3 4 5 6 7 Dodelson, S. (2003). Modern Cosmology. Academic Press. ISBN 978-0122191411.
↑ Gannon, M. (December 21, 2012). "New 'Baby Picture' of Universe Unveiled". Space.com. Retrieved December 21, 2012.
↑ Bennett, C. L.; et al. (2012). "Nine-Year Wilkinson Microwave Anisotropy Probe (WMAP) Observations: Final Maps and Results". arXiv:1212.5225 [astro-ph.CO].
↑ Hinshaw, G.; et al. (2009). "Five-year Wilkinson Microwave Anisotropy Probe observations: Data processing, sky maps, and basic results" (PDF). The Astrophysical Journal Supplement Series. 180 (2): 225. arXiv:0803.0732. Bibcode:2009ApJS..180..225H. doi:10.1088/0067-0049/180/2/225.
↑ Sunyaev, R.; Zeldovich, Ya. B. (1970). "Small-Scale Fluctuations of Relic Radiation". Astrophysics and Space Science. 7 (1): 3. Bibcode:1970Ap&SS...7....3S. doi:10.1007/BF00653471.
↑ Peebles, P. J. E.; Yu, J. T. (1970). "Primeval Adiabatic Perturbation in an Expanding Universe". The Astrophysical Journal. 162: 815. Bibcode:1970ApJ...162..815P. doi:10.1086/150713.
↑ See http://www.cfa.harvard.edu/~deisenst/acousticpeak/anim.gif
↑ See http://www.cfa.harvard.edu/~deisenst/acousticpeak/anim_many.gif
↑ Landy, S. D.; Szalay, A. S. (1993). "Bias and variance of angular correlation functions". The Astrophysical Journal. 412: 64. Bibcode:1993ApJ...412...64L. doi:10.1086/172900.
↑ Peebles, P. J. E. (1980). The large-scale structure of the universe. Princeton University Press. Bibcode:1980lssu.book.....P. ISBN 978-0-691-08240-0.
↑ http://www.sdss.org/news/releases/20050111.yardstick.html
↑ Cole, S.; et al. (2005). "The 2dF Galaxy Redshift Survey: Power-spectrum analysis of the final data set and cosmological implications". Monthly Notices of the Royal Astronomical Society. 362 (2): 505. arXiv:astro-ph/0501174. Bibcode:2005MNRAS.362..505C. doi:10.1111/j.1365-2966.2005.09318.x.
↑ Beutler, F.; et al. (2011). "The 6dF Galaxy Survey: Baryon acoustic oscillations and the local Hubble constant". Monthly Notices of the Royal Astronomical Society. 416 (4): 3017B. arXiv:1106.3366. Bibcode:2011MNRAS.416.3017B. doi:10.1111/j.1365-2966.2011.19250.x.
↑ Blake, C.; et al. (2011). "The WiggleZ Dark Energy Survey: Mapping the distance-redshift relation with baryon acoustic oscillations". Monthly Notices of the Royal Astronomical Society. 418 (3): 1707. arXiv:1108.2635. Bibcode:2011MNRAS.418.1707B. doi:10.1111/j.1365-2966.2011.19592.x.
↑ Anderson, L.; et al. (2012). "The clustering of galaxies in the SDSS-III Baryon Oscillation Spectroscopic Survey: Baryon acoustic oscillations in the Data Release 9 spectroscopic galaxy sample". Monthly Notices of the Royal Astronomical Society. 427 (4): 3435. arXiv:1203.6594. Bibcode:2012MNRAS.427.3435A. doi:10.1111/j.1365-2966.2012.22066.x.
↑ Chevallier, M; Polarski, D. (2001). "Accelerating Universes with Scaling Dark Matter". International Journal of Modern Physics D. 10: 213–224. arXiv:gr-qc/0009008. Bibcode:2001IJMPD..10..213C. doi:10.1142/S0218271801000822.
↑ Barbosa Jr., E. M.; Alcaniz, J. S. (2008). "A parametric model for dark energy". Physics Letters B. 666 (5): 415–419. arXiv:0805.1713. Bibcode:2008PhLB..666..415B. doi:10.1016/j.physletb.2008.08.012.
↑ Shi, K.; Yong, H.; Lu, T. (2011). "The effects of parametrization of the dark energy equation of state". Research in Astronomy and Astrophysics. 11 (12): 1403–1412. Bibcode:2011RAA....11.1403S. doi:10.1088/1674-4527/11/12/003.
1 2 3 Albrecht, A.; et al. (2006). "Report of the Dark Energy Task Force". arXiv:astro-ph/0609591 [astro-ph].
1 2 White, M. (2007). "The Echo of Einstein's Greatest Blunder" (PDF). Santa Fe Cosmology Workshop.

External links

Martin White's Baryon Acoustic Oscillations and Dark Energy Web Page
Daniel Eisenstein's Detection of the Baryon Acoustic Peak Web Page
Review of Baryon Acoustic Oscillations
SDSS BAO Press Release

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