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Dark energy fluctuations and structure formation. Rogério Rosenfeld Instituto de Física Teórica/UNESP. I Workshop "Challenges of New Physics in Space" Campos do Jordão, Brazil 26/04/2009. Standard Model of Cosmology. + homogeneity and isotropy. FLRW model.
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Darkenergyfluctuationsandstructureformation Rogério Rosenfeld Instituto de Física Teórica/UNESP I Workshop "Challenges of New Physics in Space" Campos do Jordão, Brazil 26/04/2009
Standard Model of Cosmology + homogeneity and isotropy FLRW model
Concordance model Summary of observations Tegmark 07 What´s going on? Cosmological constant Dynamical dark energy Modified gravity Inhomogeneities (Hubble bubble)
Standard Model of Cosmology Evolution of small perturbations: It is not possible to fully describe the non-linear regime in RG: large numerical simulations are necessary (Millenium, MareNostrum, etc…)
Semi-analytical methods to study structure formation (dark matter haloes) in the non-linear regime: • Spherical collapse model(Gunn&Gott 1972) • Press-Schechter formalism(Press&Schechter 1974)
Let’s first consider Homogeneous Dark Energy Lamartine Liberato and R. Rosenfeld, JCAP 2006
Spherical collapse model Consider a spherical region of radius r(t) with density rc(t) constant in space (“top-hat” profile) immersed in a homogeneous (FLRW) universe with density r(t) This region first expands with an expansion rate a bit smaller than the Hubble expansion. The density contrast increases and eventually this region detaches from the expansion of the universe and starts to contract (turn around).
Growth of perturbations d in the spherical collapse model Homogeneous dark energy affects only the expansion rate!
Linear growth of perturbation d in the spherical collapse model linearized equation (coincides with GR) dark matter dominated universe dark energy dominated universe Dark energy suppresses structure formation (Weinberg’s anthropic argument)
Parametrization of dark energy equation of state Completely characterizes homogeneous dark energy
Linear growth of dark matter perturbations in the presence of homogeneous dark energy larger perturbations in DE models dark matter only LCDM
Non-linear growth of dark matter perturbations in the presence of dark energy The overdense sphere shrinks and eventually collapes (perturbation diverges!) (we are not considering dissipative effects) Exemple: LCDM with initial conditions chosen such as the perturbation diverges today. non-linear evolution linear evolution Important quantity: dc(z) is defined as the linearly extrapolated perturbation such that the non-linear perturbation diverges at z.
dc(zcol) depends on the cosmological model. Einstein-de Sitter:
Press-Schechter formalism Estimate the number density of dark matter haloes with mass M at a redshift z. P&S hypothesis: fluctuations of linear density contrast d are gaussian. Structure form in regions where d>dc . Critical density is computed in the spherical approx. P&S mass function can be derived rigorously using excursion set theory This simple approximation captures main features of the cluster mass function
If DE is not a cosmological constant, its density can (and should) also vary! We now consider the consequences of the existence of dark energy fluctuations Inhomogeneous Dark Energy L. R. Abramo, R. C. Batista, L. Liberato e R. Rosenfeld, JCAP 0711:012 (2007)
Parametrization of dark energy background equation of state Characterizes completely the dark energy background In order to characterize the pressure perturbations of dark energy in the context of a simplified assumption it is convenient to introduce: “effective” speed of sound (Hu 98)
Top-hat spherical collapse model Equation of state inside perturbed region can be different from the background: Let’s first consider the case where there is no change in w:
Top-hat spherical collapse model Non-linear equations for the evolution of perturbations in the 2 fluids (dark matter and dark energy): Weshowedthatthesameequationsalsoarisefromtheso-called pseudo-newtonianformalism for general . Wealsocomparedtheirlinearizedformwithlinearized GR recently: L.R.Abramo, R.C.Carlotto, L. Liberato and RR arXiv 0806.3461, Phys.Rev.D79:023516,2009
Growth of perturbations Non-phantom case: dark energy clusters and suppresses structure formation
Growth of perturbations Phantom case: dark energy becomes underdense and enhances structure formation
Growth of perturbations non-linear regime non-phantom phantom
Non-linear regime dc(z) including dark energy perturbations. Large modifications in number counts. non-phantom case: suppresses structure formation phantom case: enhances structure formation
Dark energy mutation L. R. Abramo, R. C. Batista, L. Liberato e R. Rosenfeld, Phys.Rev.D77:067301,2008 Equation of state inside perturbed region can be different from the background: small effect for dDE<<1
Dark energy mutation dw can be large in the non-linear regime, dDE~1 Effect was already seen in Mota & van de Bruck (2004) in the context of a scalar field w = -0.8 w = -0.99
ConclusionsandChallenges • Dark energy has a large impact on the structure formation in the universe (used in the 1987 Weinberg’s anthropic argument) • Effects of homogeneous dark energy is completely characterized by its • equation of state • Effects of inhomogenous dark energy needs at least one extra function: • Dark energy cumpling can alter its equation of state (mutation) • It can be possible to distinguish among different dark energy models using • future cluster number counts data. Errors in parameter estimations using • Fisher matrix and characteristics of a given experiment • (SPT+DES, LSST, EUCLID, ...). See Abramo’s talk! • It would be important to have a more precise study of a scalar field in GR • with spherical symmetry (LTB) to confirm (or not) the approximations. • see Ronaldo’s talk! • N-body simulations including DE fluctuations?
Adiabatical perturbations For a two fluid combination, the perturbations are adiabatic when: In the case of dark matter and dark energy:
Parametrize Viana e Liddle (1996) M8 is the mass cointained in a sphere of radius R8 = 8 h-1 Mpc.
