Post on 18-Jan-2016
The Pursuit of primordial non-Gaussianity in the
large scale structure of the universe
Donghui JeongTexas Cosmology Center and Astronomy Department
University of Texas at Austin
Astronomy Colloquium, Seoul National University, 27 May 2010
Contents
IntroductionPart I. Gaussian halo biasPart II. Non-Gaussian halo bias
II.1. Effect on the galaxy power spectrumII.2. Effect on the galaxy bispectrum
II.3. Effect on the galaxy-galaxy, galaxy-CMB lensing
The concordance cosmological model• Our universe is flat, and dominated by cosmological constant• From “WMAP+BAO+H0”
in Komatsu et al. (2010):
From inflation to now
Four biggest challenges in cosmology
We do not know the nature of the building blocks!
• Inflation How does our Universe begin, or what drives inflation?
• Dark Matter What is/are the dark matter(s) made of?
• Dark Energy What drives the current acceleration? Is this really the cosmological constant?
• Dark Matter, Dark Energy Is General Relativity a valid theory in the cosmological scales?
The answer will come from galaxy surveys• On-going, near future surveys
– Baryon Oscillation Spectroscopic Survey (0.2 < z < 0.7, 10,000 sq. deg.)– WiggleZ (0.2 < z < 1.0, 1,000 sq. deg.)– Hobby-Eberly Telescope Dark Energy eXperiment
(1.9 < z < 3.5, 420 sq. deg.) : Start observing from Fall 2011!!
• Surveys which may happen in the future– BigBOSS (0.2 < z < 0.7)– Euclid (0 < z < 2.0)– Cosmic Inflation Probe (1 < z < 6)– SUMIRE/LAS (?? < z < ??)– and more to be proposed
Comparing galaxy surveys
dV/dz for 1 str. (~3300 sq. deg.) survey area
~3 [Gpc/h]3
~6 [Gpc/h]3
~1.5 [Gpc/h]3
~1.3 [Gpc/h]3
420 sq. deg.1000 sq. deg.
10,000 sq. deg.
7600 sq. deg.
I. Power spectrum
• Probability of finding two galaxies at separa-tion r is given by the two-point correlation function
• P(k) is the Fourier transform of ξ(r)
• Or, in terms of density contrast, δ(k),
dV1
dV2
r
II. Bispectrum
• Probability of finding three galaxies at sepa-ration (r, s, t) is given by the two, and three-point correlation function
• B(k,k’) is the Fourier transform of ζ(r,s).
• Or, in terms of density contrast,
dV1
dV2
r s
dV3
t
Inflation sets the initial condition
Seed fluctuations predicted by most inflation models are nearly scale invariant and obey nearly Gaussian statistics, which are often parametrized as
• Initial power spectrum
• Initial bispectrum
Here, primordial curvature perturbation is defined as (local type)
Primordial cur-vature erturba-tion
Gaussian ran-dom field
Constraining inflation models
From WMAP7+BAO+H0 (Komatsu et al. 2010)
Primordial non-Gaussianity• Well-studied parameterization is “local” non-Gaussianity :
• Current best measurement of fNL
– From CMB (Komatsu et al, 2010)
– From SDSS power spectra (Slosar et al, 2009)
• Therefore, initial condition is Gaussian to ~0.04% level!Thus, I am talking about a very tiny non-Gaussianity!
Primordial curvature perturba-tion
Gaussian random field
Single-field Theorem(Consistency relation)
• For ANY single-field inflation models, where there is only one degree of freedom during inflation,Maldacena(2003);Seery&Lidsey(2005);Creminelli&Zaldarriaga(2004)
• With the current limit of ns=0.96, fNL has to be about 0.017 for single field inflation.
• Therefore, any detection of fNL would rule out all the single field models regardless of– The form of potential– The form of kinetic term (or sound speed)– The initial vacuum state
• We can detect primordial non-Gaussianity from– CMB bispectrum– High-mass cluster abundance– Scale dependent bias
• Galaxy power spectrum• Galaxy bispectrum (Jeong & Komatsu, 2009b)• Weak gravitational lensing (Jeong, Komatsu, Jain, 2009)
Implication of non-Gaussianity
Galaxies are biased tracers• Cosmological theory (or N-body simulation) tells us about the
dark matter distribution, not about the galaxy distribution.• What we observe from survey are galaxies, not dark matter.• Bias : How is galaxy distribution related to the matter distribu-
tion?
m
m
G
G
ρ
δρf
ρ
δρ
From dark matter to galaxies• In order to calculate the bias from the first principle, we need
to understand the complicated galaxy formation theory such as– Dark matter halo formation– Merger history– Chemistry and cooling– Background radiation (UV)– Feedback (SN, AGN, …)– (and even more)
• Each item is the separate research topic.
Bias : a simple approach(works only on large scales)
• Galaxies are formed inside of dark matter halos.• Halos form at the peak of density field!• But, not every peak forms a halo.
– The peak has to have sufficient over-density.– Let’s say there is a threshold over-density, δc, above which dark matter
clumps to form a halo.– A halo of mass M is
“a region in the space around the peak of smoothed density field (depends on M) whose over-density is greater than the critical over-density.”
• Simplest assumption : – Every dark matter halo hosts a galaxy, or galaxies.
Recipes : Finding galaxies (2D example)
x
ydm
Smoothing(or picking up a certain mass M)
Find peaks above threshold
Critical over-den-sity surface
Galaxies
Contents
IntroductionPart I. Gaussian halo biasPart II. Non-Gaussian halo bias
II.1. Effect on the galaxy power spectrumII.2. Effect on the galaxy bispectrum
II.3. Effect on the galaxy-galaxy, galaxy-CMB lensing
Gaussian density field• One point statistics : The PDF of filtered density field(y) at a
given point is completely determined by r.m.s. of fluctuation, :
• Two point statistics : The covariance of filtered density field is given by the two point correlation function.
Note that
)()()( yyxx RRR
R
]2
exp[2
1)(
2
2
2RR
yyP
)0()()(2RRRR xx
• Fraction of collapsed objects with scale larger than R
Cumulative mass function
dyy
Pc RR
]2
exp[2
12
2
21
• What is the probability of finding two galaxies separated by a distance r?– Joint Probability that two points x and x+r have galaxies at the same
time.
where and .
Question asked by Kaiser (1984)
c c
yCydydyC
P T
]
2
1exp[
||2
1 1212
2
1
y
yy
2
2
)(
)(
RR
RR
r
rC
y1
y2
r
Galaxy bias is linear on large scales!• Galaxy correlation function can be calculated as
on large scales, when, δc σ≫ R (high peak approximation).
• On large enough scale, galaxy correlation function is simply proportional to the matter correlation function.
• This relation is called a linear bias.
)(1)(12
221
2 rP
Pr R
R
cG
Galaxy bias : 2nd method• Linear bias means the linear relation between matter density
contrast and the galaxy density contrast.
• One can change the question to the following: For a given large scale over-dense region, what is the over-density (excess number) of galaxies in that region?
m
m
G
G
ρ
δρb
ρ
δρ
Peak-background split method• Decomposing a density field as peak (on galaxy scale) and
background (on matter fluctuation scale).– 1D schematic example (peaks in the over-dense region)
Peak Background
(Gaussian Random field) (Offset from cosmic mean)
x
m
Large scale over-density+
Galaxies with/without BG• Positive (negative) background effectively reduces (increases)
the threshold over-density.
3 Peaks without background 11 Peaks with background
Threshold over-density
= cosmic mean density of galaxies(e.g. mass function)
= mass function with a positive offset, or reduced threshold!!(see, dashed line in the left figure)
All we need is a Mass function• Therefore, mass function determines the bias!
– Example: for Press-Schetchter mass function,
bias is given by
mc
c
c
cdmc
G
G mn
mn
mnmn
),(ln
),(
),(),(
How accurate is it?
• Only qualitatively useful. (e.g. Jeong & Komatsu (2009))
Prediction from theory (Sheth-Tormen mass function)
measured from Millen-nium simulation Higher peaks
Lower peaks
Higher peaks
Lower peaks
Contents
IntroductionPart I. Gaussian halo biasPart II. Non-Gaussian halo bias
II.1. Effect on the galaxy power spectrumII.2. Effect on the galaxy bispectrum
II.3. Effect on the galaxy-galaxy, galaxy-CMB lensing
From initial curvature to density
Taking Laplacian
grad(φ)=0 at the potential peak
Poisson equation Laplacian(φ)∝δρ=δ<ρ>
Dalal et al.(2008); Matarrese&Verde(2008); Carmelita et al.(2008); Afshordi&Tolly(2008); Slosar et al.(2008);
Dalal et al. (2008)
N-body result : effect of nG
Result from Dalal et al. (2008)
“Large positive fNL acceler-ates the evolution of over-dense regions and retards the evolution of under-dense regions, while large negative fNL has precisely the opposite effect”
Then, what about gal-axy bias?
fNL =-5000
fNL =-500
fNL =0
fNL =500
fNL =5000
375 Mpc/h
80 M
pc/h
Again, peak-background split• Non-Gaussian density field at the peak has additional contri-
bution from the primordial curvature perturbation!
Peak BG1:densityBG2:curvature
+ +Increase once by large scale density
Increase once more by large scale curvature
Galaxies with/without nG
• Positive (negative) fNL effectively reduces (increases) the threshold over-density further more.– Remember, δΦ is always positive!
11 Peaks with Gaussianity 17 Peaks with non-Gaussianity
Threshold over-density
= mass function with additional positive off-set, or reduced threshold!!
Galaxy bias with nG• The primordial non-Gaussianity changes the galaxy power
spectrum by
where change of linear bias is given by
Linear bias depends on the scale!!
snkkP 4
1)(
~1/k2
N-body test of P(k) I (Dalal et al. 2008)H
alo-
matt
er c
orre
latio
n
N-body test of P(k) II (Desjacques et al. 2009)
Pmh(k)Phh(k), Halo-Halo correlation
Can we detect this? (e.g. HETDEX)
Galaxy power spectrum in real spaceΔfNL=21 (68% C.L.) Comparable to WMAP7!!
The galaxy P(k) in redshift space • Peculiar velocity, which further shift the redshift of the galaxy
induces yet another change in power spectrum (Kaiser effect)• As a result, power spectrum becomes anisotropic:
increase in clustering along line of sight direction
μ
Prediction for galaxy surveys
• Predicted 1-sigma marginalized error of non-linearity pa-rameter (fNL): 10000 sq. deg. galaxy survey (CIP)
z V[Gpc/h]3
ng
10-3[h/Mpc]3B1 ΔfNL
(Kmax=0.1 [h/Mpc])ΔfNL
(Kmax=0.2 [h/Mpc])
1.25 17.43 93.120 1.37 6.11 4.991.75 20.91 52.738 1.61 5.04 4.022.25 22.20 28.501 1.96 4.46 3.492.75 22.26 13.217 2.44 4.12 3.163.25 21.69 5.067 3.10 3.90 2.943.75 20.83 3.744 3.57 3.77 2.794.25 19.84 2.586 4.09 3.68 2.694.75 18.82 1.537 4.71 3.64 2.635.25 17.82 0.7726 5.46 3.65 2.625.75 16.87 0.3898 6.23 3.71 2.666.25 15.97 0.2058 7.00 3.85 2.76
Contents
IntroductionPart I. Gaussian halo biasPart II. Non-Gaussian halo bias
II.1. Effect on the galaxy power spectrumII.2. Effect on the galaxy bispectrum
II.3. Effect on the galaxy-galaxy, galaxy-CMB lensing
Bispectrum and non-Gaussianity• Bispectrum is the Fourier space counter part of three point
correlation function:
• CMB (z~1100) bispectrum is a traditional tool to test the non-Gaussianity, because it should vanish when density field is Gaussian.– The latest limit on fNL is (Smith et al. 2009) fNL= 38±21 (68% C.L.)
– Predicted 68% C.L. range of Planck satellite is ΔfNL= 5.
The galaxy bispectrum: theory• The galaxy bispectrum consists of four pieces
I. Matter bispectrum due to primordial non-GaussianityII. Matter bispectrum due to non-linear gravitational evolutionIII. Non-linear galaxy biasIV. Non-Gaussianity term from peak correlation
I
II
III
IV
Jeong & Komatsu (2009b)
Triangular configurations
Bispectrum of Gaussian Universe• We can measure bias from Equilateral and Folded triangles:
Δb1/b1= 0.01, Δb2/b2= 0.05 for HETDEXBispectrum from non-linear gravitational evolution
Bispectrum from non-linear galaxy bias
Jeong & Komatsu (2009b)
Linearly evolved primordial bispectrum
• Notice the factor of k2 in the denominator.• Sharply peaks at the squeezed configuration!
N-body test of matter bispectrum
fNL
Matt
er b
ispe
ctru
m
Nishimichi et al. (in preparation)20 runs of (8 Gpc/h)3 simulations
large scale
squeezed
Non-Gaussian peak correlation terms
• The galaxy bispectrum also depends on trispectrum (four point function) of underlying mass distribution!!
Jeong & Komatsu (2009)
Matter trispectrum I. TΦ
• For local type non-Gaussianity,
• Primordial trispectrum is given by
• For more general multi-field inflation, trispectrum is
Shape of TΦ terms
• Both of TΦ terms peak at squeezed configurations.
• fNL2 term peaks more sharply than gNL term!!
Matter trispectrum II. T1112
• Trispectrum generated by non-linearly evolved primordial non-Gaussianity.
Shape of T1112 terms
• T1112 terms also peak at squeezed configurations.
• T1112 terms peak almost as sharp as gNL term.
Are new terms important? (z=0)Jeong & Komatsu (2009)
N-body galaxy bispectrum
fNL
Gal
axy
bisp
ectr
um
Nishimichi et al. (in preparation)20 runs of (8 Gpc/h)3 simulations
large scale
squeezed
Even more important at high-z!! (z=3)Jeong & Komatsu (2009)
Prediction for galaxy surveys• Predicted 1-sigma marginalized error of non-linearity parame-
ter (fNL) from the galaxy bispectrum alone
z V[Gpc/h]3
ng
10-5[h/Mpc]3b1 ΔfNL
(SK07)ΔfNL
(JK09)
SDSS-LRG0.315 1.48 136 2.17 60.38 5.43
BOSS0.35 5.66 26.6 1.97 31.96 3.13
HETDEX2.7 2.96 27 4.10 20.39 2.35
CIP2.25 6.54 500 2.44 8.96 0.99
ADEPT1.5 107.3 93.7 2.48 5.65 0.92
EUCLID1.0 102.9 156 1.93 5.56 0.77
Jeong (2010)
Contents
IntroductionPart I. Gaussian halo biasPart II. Non-Gaussian halo bias
II.1. Effect on the galaxy power spectrumII.2. Effect on the galaxy bispectrum
II.3. Effect on the galaxy-galaxy, galaxy-CMB lensing
fNL from Weak gravitational lensing
Picture from M. Takada (IPMU)
Jeong, Komatsu, Jain (2009)
• Mean tangential shear is given by
It is often written as
where, Σc is the “critical surface density”
Mean tangential shear
G
R
Mean tangential shear, status
Mean tangential shear from SDSS Sheldon et al. (2009)
What about larger scales?
BAO in mean tangential shear
RBAO=106.9 Mpc/h
Δχ2 = 0.85
Errors are dominated by cosmic variance.
(SDSS LRG)
Jeong, Komatsu, Jain (2009)
BAO in mean tangential shear
Even larger scale?
Result from the thin (delta function) lens plane
RBAO=106.9 Mpc/hΔχ2 = 1.34
(LSST cluster)
Jeong, Komatsu, Jain (2009)
fNL in mean tangential shear (LRG)Jeong, Komatsu, Jain (2009)
fNL in mean tangential shear (LSST)Jeong, Komatsu, Jain (2009)
CMB anisotropy as a backlight
Picture from Hu & Okamoto (2001)
Unlensed
Lensed
Galaxy-CMB lensing, z=0.3Jeong, Komatsu, Jain (2009)
Galaxy-CMB lensing, z=0.8Jeong, Komatsu, Jain (2009)
Cluster-CMB lensing, z=5High-z population provide a better chance of finding fNL.
Jeong, Komatsu, Jain (2009)
Conclusion• Detecting primordial non-Gaussianity will rule out all single
field inflation models. We can estimate the primordial non-Gaussianigy from large scale structure of the universe.
• For Gaussian case, large scale bias is a constant, but for non-Gaussian case, it depends on the wave-number sharply.
• The galaxy power spectrum and the galaxy bispectrum are very promising tools to prove primordial non-Gaussianities!!
• Weak gravitational lensing on large scales can provides inde-pendent cross-checks of non-Gaussianity.