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New Probes of Initial State of Quantum Fluctuations during
InflationEiichiro Komatsu (Texas Cosmology Center, Univ. of Texas at Austin;
Max-Planck-Institut für Astrophysik)ACP Seminar at IPMU, July 13, 2012
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This talk is based on...
• Squeezed-limit bispectrum
• Ganc & Komatsu, JCAP, 12, 009 (2010)
• Non-Bunch-Davies vacuum and CMB
• Ganc, PRD 84, 063514 (2011)
• Scale-dependent bias and μ-distortion
• Ganc & Komatsu, PRD 86, 023518 (2012) 2
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Question
• Did inflation really occur?
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Question
• Did inflation* really occur?
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* By “inflation,” I mean a period of the early universe during which the expansion of the universe accelerates. (Quasi-exponential expansion.)
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Does this plot prove inflation?
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(Tem
pera
ture
Flu
ctua
tion)
2
=180 deg/θ
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Inflation looks good(in 2-point function)
• Pscalar(k)~kns–4
• ns=0.968±0.012 (68%CL; WMAP7+BAO+H0)
• r=4Ptensor(k)/Pscalar(k)
• r < 0.24 (95%CL; WMAP7+BAO+H0)
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Komatsu et al. (2011)
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Motivation
• Can we falsify inflation?
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Falsifying “inflation”
• We still need inflation to explain the flatness problem!
• (Homogeneity problem can be explained by a bubble nucleation.)
• However, the observed fluctuations may come from different sources.
• So, what I ask is, “can we rule out inflation as a mechanism for generating the observed fluctuations?”
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First Question:
• Can we falsify single-field inflation?
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*I will not be talking about multi-field inflation today: for potentially ruling out multi-field inflation, see
Sugiyama, Komatsu & Futamase, PRL, 106, 251301 (2011)
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• Single-field inflation = One degree of freedom.
• Matter and radiation fluctuations originate from a single source.
= 0
* A factor of 3/4 comes from the fact that, in thermal equilibrium, ρc~ργ3/4
Cold Dark Matter
Photon
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An Easy One: Adiabaticity
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Non-adiabatic Fluctuations
• Detection of non-adiabatic fluctuations immediately rule out single-field inflation models.
The current CMB data are consistent with adiabatic fluctuations:
< 0.09 (95% CL)| |
Komatsu et al. (2011)
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Let’s use 3-point function
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model-dependent function
k1
k2
k3
• Three-point function (bispectrum)
• Bζ(k1,k2,k3) = <ζk1ζk2ζk3> = (amplitude) x (2π)3δ(k1+k2+k3)b(k1,k2,k3)
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MOST IMPORTANT, for falsifying single-field inflation
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Curvature Perturbation• In the gauge where the energy density is uniform, δρ=0, the metric on super-horizon scales (k<<aH) is written as
ds2 = –N2(x,t)dt2 + a2(t)e2ζ(x,t)dx2
• We shall call ζ the “curvature perturbation.”
• This quantity is independent of time, ζ(x), on super-horizon scales for single-field models.
• The lapse function, N(x,t), can be found from the Hamiltonian constraint.
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Action
• Einstein’s gravity + a canonical scalar field:
•S=(1/2)∫d4x√–g [R–(∂Φ)2–2V(Φ)]
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Maldacena (2003)
(3)3 3
Quantum-mechanical Computation of the Bispectrum
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Initial Vacuum State
• Bunch-Davies vacuum, ak|0>=0 with
ζ
[η: conformal time]
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• Bζ(k1,k2,k3) = <ζk1ζk2ζk3> = (amplitude) x (2π)3δ(k1+k2+k3)b(k1,k2,k3)
Maldacena (2003)Result
k1
k2
k3
• b(k1,k2,k3)=
x{ }18Complicated? But...
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• Bζ(k1,k2,k3) = <ζk1ζk2ζk3> = (amplitude) x (2π)3δ(k1+k2+k3)b(k1,k2,k3)
Maldacena (2003)
k1
k2
k3
• b(k1,k1,k3->0)=
x{ }19
Taking the squeezed limit(k3<<k1≈k2)
2k13 k13 k13 2k13
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Maldacena (2003)
k1
k2
k3
• b(k1,k1,k3->0)=
20
Taking the squeezed limit(k3<<k1≈k2)
[2 ]k13k331
• Bζ(k1,k2,k3) = <ζk1ζk2ζk3> = (amplitude) x (2π)3δ(k1+k2+k3)b(k1,k2,k3)
=
=1–ns
(1–ns)Pζ(k1)Pζ(k3)
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Single-field Theorem (Consistency Relation)
• For ANY single-field models*, the bispectrum in the squeezed squeezed limit (k3<<k1≈k2) is given by
• Bζ(k1,k1,k3->0) = (1–ns) x (2π)3δ(k1+k2+k3) x Pζ(k1)Pζ(k3)
Maldacena (2003); Seery & Lidsey (2005); Creminelli & Zaldarriaga (2004)
* for which the single field is solely responsible for driving inflation and generating observed fluctuations. 21
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Single-field Theorem (Consistency Relation)
• For ANY single-field models*, the bispectrum in the squeezed squeezed limit (k3<<k1≈k2) is given by
• Bζ(k1,k1,k3->0) = (1–ns) x (2π)3δ(k1+k2+k3) x Pζ(k1)Pζ(k3)
Maldacena (2003); Seery & Lidsey (2005); Creminelli & Zaldarriaga (2004)
* for which the single field is solely responsible for driving inflation and generating observed fluctuations. 22
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Single-field Theorem (Consistency Relation)
• For ANY single-field models*, the bispectrum in the squeezed squeezed limit (k3<<k1≈k2) is given by
• Bζ(k1,k1,k3->0) = (1–ns) x (2π)3δ(k1+k2+k3) x Pζ(k1)Pζ(k3)
• Therefore, all single-field models predict fNL≈(5/12)(1–ns).
• With the current limit ns=0.96, fNL is predicted to be 0.017.
Maldacena (2003); Seery & Lidsey (2005); Creminelli & Zaldarriaga (2004)
* for which the single field is solely responsible for driving inflation and generating observed fluctuations. 23
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Limits on fNL
When fNL is independent of wavenumbers, it is called the “local type.”
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Komatsu&Spergel (2001)
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Limits on fNL
• fNL = 32 ± 21 (68%C.L.) from WMAP 7-year data
• Planck’s CMB data is expected to yield ΔfNL=5.
• fNL = 27 ± 16 (68%C.L.) from WMAP 7-year data combined with the limit from the large-scale structure (by Slosar et al. 2008)
• Future large-scale structure data are expected to yield ΔfNL=1.
Komatsu et al. (2011)
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Understanding the Theorem
• First, the squeezed triangle correlates one very long-wavelength mode, kL (=k3), to two shorter wavelength modes, kS (=k1≈k2):
• <ζk1ζk2ζk3> ≈ <(ζkS)2ζkL>
• Then, the question is: “why should (ζkS)2 ever care about ζkL?”
• The theorem says, “it doesn’t care, if ζk is exactly scale invariant.”
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ζkL rescales coordinates
• The long-wavelength curvature perturbation rescales the spatial coordinates (or changes the expansion factor) within a given Hubble patch:
• ds2=–dt2+[a(t)]2e2ζ(dx)2
ζkLleft the horizon already
Separated by more than H-1
x1=x0eζ1 x2=x0eζ2
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ζkL rescales coordinates
• Now, let’s put small-scale perturbations in.
• Q. How would the conformal rescaling of coordinates change the amplitude of the small-scale perturbation?
ζkLleft the horizon already
Separated by more than H-1
x1=x0eζ1 x2=x0eζ2
(ζkS1)2 (ζkS2)2
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ζkL rescales coordinates
• Q. How would the conformal rescaling of coordinates change the amplitude of the small-scale perturbation?
• A. No change, if ζk is scale-invariant. In this case, no correlation between ζkL and (ζkS)2 would arise.
ζkLleft the horizon already
Separated by more than H-1
x1=x0eζ1 x2=x0eζ2
(ζkS1)2 (ζkS2)2
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Real-space Proof• The 2-point correlation function of short-wavelength
modes, ξ=<ζS(x)ζS(y)>, within a given Hubble patch can be written in terms of its vacuum expectation value (in the absence of ζL), ξ0, as:
• ξζL ≈ ξ0(|x–y|) + ζL [dξ0(|x–y|)/dζL]
• ξζL ≈ ξ0(|x–y|) + ζL [dξ0(|x–y|)/dln|x–y|]
• ξζL ≈ ξ0(|x–y|) + ζL (1–ns)ξ0(|x–y|)
Creminelli & Zaldarriaga (2004); Cheung et al. (2008)
3-pt func. = <(ζS)2ζL> = <ξζLζL>= (1–ns)ξ0(|x–y|)<ζL2>
• ζS(x)
• ζS(y)
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This is great, but...• The proof relies on the following Taylor expansion:
• <ζS(x)ζS(y)>ζL = <ζS(x)ζS(y)>0 + ζL [d<ζS(x)ζS(y)>0/dζL]
• Perhaps it is interesting to show this explicitly using the in-in formalism.
• Such a calculation would shed light on the limitation of the above Taylor expansion.
• Indeed it did - we found a non-trivial “counter-example” (more later) 33
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An Idea
• How can we use the in-in formalism to compute the two-point function of short modes, given that there is a long mode, <ζS(x)ζS(y)>ζL?
• Here it is!
S S(3)
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ζL
Ganc & Komatsu, JCAP, 12, 009 (2010)
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• Inserting ζ=ζL+ζS into the cubic action of a scalar field, and retain terms that have one ζL and two ζS’s.
S S(3)
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ζL
(3)
Ganc & Komatsu, JCAP, 12, 009 (2010)
Long-short Split of HI
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Result
• where
Ganc & Komatsu, JCAP, 12, 009 (2010)
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Result
• Although this expression looks nothing like (1–nS)P(k1)ζkL, we have verified that it leads to the known consistency relation for (i) slow-roll inflation, and (ii) power-law inflation.
• But, there was a curious case – Alexei Starobinsky’s exact nS=1 model.
• If the theorem holds, we should get a vanishing bispectrum in the squeezed limit.
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Starobinsky’s Model
• The famous Mukhanov-Sasaki equation for the mode function is
where
•The scale-invariance results when
So, let’s write z=B/η
Starobinsky (2005)
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Starobinsky’s Potential
• This potential is a one-parameter family; this particular example shows the case where inflation lasts very long: φend ->∞ 39
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Result
• It does not vanish!
• But, it approaches zero when Φend is large, meaning the duration of inflation is very long.
• In other words, this is a condition that the longest wavelength that we observe, k3, is far outside the horizon.
• In this limit, the bispectrum approaches zero.
Ganc & Komatsu, JCAP, 12, 009 (2010)
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Initial Vacuum State?
• What we learned so far:
• The squeezed-limit bispectrum is proportional to (1–nS)P(k1)P(k3), provided that ζk3 is far outside the horizon when k1 crosses the horizon.
• What if the state that ζk3 sees is not a Bunch-Davies vacuum, but something else?
• The exact squeezed limit (k3->0) should still obey the consistency relation, but perhaps something happens when k3/k1 is small but finite. 41
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How squeezed?
• With CMB, we can measure primordial modes in l=2–3000. Therefore, k3/k1 can be as small as 1/1500.
Keisler et al. (2011) Tem
pera
ture
Pow
er S
pect
rum
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• With large-scale structure, we can measure primordial modes in k=10–3–1 Mpc–1. Therefore, k3/k1 can be as small as 1/1000.
How squeezed?
Hlozek et al. (2011)
43
Mat
ter
Pow
er S
pect
rum
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4K Black-body2.725K Black-body2K Black-bodyRocket (COBRA)Satellite (COBE/FIRAS)CN Rotational TransitionGround-basedBalloon-borneSatellite (COBE/DMR)
Wavelength 3mm 0.3mm30cm3m
Brig
htne
ss, W
/m2 /s
r/Hz
44
(plot from Samtleben et al. 2007)
Using the distortion of the thermal spectrum of CMB, we can reach k3/k1 as small as 10–8! (Pajer & Zaldarriaga 2012)
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Back to in-in
• The Bunch-Davies vacuum: uk’ ~ ηe–ikη (positive frequency mode)
• The integral yields 1/(k1+k2+k3) -> 1/(2k1) in the squeezed limit
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Back to in-in
• Non-Bunch-Davies vacuum: uk’ ~ η(Ake–ikη + Bke+ikη)
• The integral yields 1/(k1–k2+k3), peaking in the folded limit
• The integral yields 1/(k1–k2+k3) -> 1/(2k3) in the squeezed limit
negative frequency mode
Chen et al. (2007); Holman & Tolley (2008)
Agullo & Parker (2011)Enhanced by k1/k3: this can be a big factor!
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Enhanced Squeezed-limit Bispectrum
• The second term blows up as k1/k3 -> 0.
• Important consequences for observables!
Agullo & Parker (2011)
47
k3/k1<<1 ζ ζζ
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An interesting possibility:• What if k3η0 = O(1)?
• The squeezed bispectrum receives an enhancement of order εk1/k3, which can be sizable.
• Most importantly, the bispectrum grows faster than the local-form toward k3/k1 -> 0!
• Bζ(k1,k2,k3) ~ 1/k33 [Local Form]
• Bζ(k1,k2,k3) ~ 1/k34 [non-Bunch-Davies]
• This has an observational consequence – particularly a scale-dependent bias and distortion of CMB spectrum.
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Power Spectrum of Galaxies
• Galaxies do not trace the underlying matter density fluctuations perfectly. They are biased tracers.
• “Bias” is operationally defined as
• bgalaxy2(k) = <|δgalaxy,k|2> / <|δmatter,k|2>
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Density-ζ Relation• It is given by the Poisson equation:
ζ
T(k)->1 for k<<10–2 Mpc–1
T(k)->(lnk)2/k4 for k>>10–2 Mpc–1
D(k,z)=1/(1+z) during the matter-dominated era
Positive ζk -> positive δm,k!50
2
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Galaxy clustering modified by the squeezed limit
• The existence of long-wavelength ζ changes the small-scale power of δm.
• A positive long-wavelength ζ -> more power on small scales, for a positive squeezed-limit bispectrum.
• More power on small scales -> more galaxies formed.
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Scale-dependent Bias
• A rule-of-thumb:
• For B(k1,k2,k3) ~ 1/k3p, the scale-dependence of the halo bias is given by b(k) ~ 1/kp–1
• For a local-form (p=3), it goes like b(k)~1/k2
• For a non-Bunch-Davies vacuum (p=4), would it go like b(k)~1/k3?
Dalal et al. (2008); Matarrese & Verde (2008); Desjacques et al. (2011)
52
MR(k)~k2 for k<<1/Rand small for k>>1/R
R is the linear size of dark matter halos
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It does! Ganc & Komatsu (2012)
Wavenumber, k [h Mpc–1]
Δbga
laxy
(k)/
b gal
axy
~k–3
~k–2
Local (fNL=10)
non-BD vacuum
(ε=0.01; Nk=1)
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CMB Bispectrum• The expected contribution to fNL as measured by the
CMB bispectrum is typically fNL≈8(ε/0.01).
• A lot bigger than (5/12)(1–nS), and could be detectable with Planck.
• Note that this does not mean a violation of the single-field consistency condition, which is valid in the exact squeezed limit, k3->0.
• We have an enhanced bispectrum in the squeezed configuration where k3/k1 is small but finite.
Ganc, PRD 84, 063514 (2011); Ganc & Komatsu (2012)
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4K Black-body2.725K Black-body2K Black-bodyRocket (COBRA)Satellite (COBE/FIRAS)CN Rotational TransitionGround-basedBalloon-borneSatellite (COBE/DMR)
Wavelength 3mm 0.3mm30cm3m
Brig
htne
ss, W
/m2 /s
r/Hz
55
(plot from Samtleben et al. 2007)
Using the distortion of the thermal spectrum of CMB, we can reach k3/k1 as small as 10–8! (Pajer & Zaldarriaga 2012)
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Damping of Acoustic Waves
• Energy stored in the acoustic waves must go somewhere -> heating of CMB photons -> distortion of the thermal spectrum
Tem
pera
ture
Pow
er S
pect
rum
Exponential Damping
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Chemical potential from energy injection
• Suppose that some energy, ΔE, is injected into the cosmic plasma during the radiation dominated era.
• What happens? The thermal spectrum of CMB should be distorted!
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Chemical potential from energy injection
• For z>zi=2x106, double Compton scattering, e–+γ->e–
+2γ, is effective, erasing the distortion of the thermal spectrum of CMB.
• Black-body spectrum is restored.
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Chemical potential from energy injection
• For z<zi=2x106, double Compton scattering, e–+γ->e–
+2γ, freezes out.
• However, the elastic scattering, e–+γ->e–+γ, remains effective [until zf=5x104]
• Black-body spectrum is not restored, but the spectrum relaxes to a Bose-Einstein spectrum with a non-zero chemical potential, μ, for zf<z<zi:
59n(ν)=
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Chemical potential from energy injection
• Energy density is added to the plasma (μ<<1):
• aT4 + ΔE/V = a(T’)4(1–1.11μ)
• Number density is conserved (μ<<1):
• bT3 = b(T’)3(1–1.37μ)
• Solving for μ gives
• μ=1.4[ΔE/(aT4V)]=1.4(ΔE/E) 60
n(ν)=
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How much energy?
• Only 1/3 of the total energy stored in the acoustic wave during radiation era is used to heat CMB (thus distorting the CMB spectrum) (papers by Jens Chluba):
• Q = (1/3)(9/4)cs2ργ(δγ)2 = (1/4)ργ(δγ)2
• μ≈1.4∫dz[(dQ/dz)/ργ]
=(1.4/4)[(δγ)2(zi)–(δγ)2(zf)]
• where zi=2x106 and zf=5x104
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Bottom Line• Therefore, the chemical potential is generated by
the photon density perturbation squared.
• At what scale? The diffusion damping occurs at the mean free path of photons. In terms of the wavenumber, it is given by:
62
It’s a very small scale! (compared to the large-scale structure, k~1 Mpc–1)
;
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μ-distortion modified by the squeezed limit
• The existence of long-wavelength ζ changes the small-scale power of δγ.
• A positive long-wavelength ζ -> more power on small scales for a positive squeezed-limit bispectrum.
• More power on small scales -> more μ-distortion.
• μ-distortion becomes anisotropic on the sky! (Pajer & Zaldarriaga 2012) 63
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μ-T cross-correlation
• In real space:
• μ = (1.4/4)[(δγ)2(zi)–(δγ)2(zf)] at k1~O(102)–O(104)
• ΔT/T = –(1/5)ζ at k3~O(10–4) [in the Sachs-Wolfe limit]
• Correlating these will probe the bispectrum in the squeezed configuration with k3/k1=O(10–6)–O(10–8)!!
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More exact treatment
• Going to harmonic space:
• ΔT/T(n)=∑almTYlm(n); μ(n)=∑almμYlm(n)
•
•
[gTl(k) contains info about the acoustic oscillation]
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μ-T cross-power spectrum
• Here, the integral is dominated by k1≈k2≈kD (which is big) and k≈l/rL (which is small because rL=14000 Mpc)
• Very squeezed limit bispectrum
Pajer & Zaldarriaga (2012); Ganc & Komatsu (2012)
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Local-form ResultGanc & Komatsu (2012)
67
Sachs-Wolfe approximation (Pajer&Zaldarriaga)
Full calculation (our result)
[always negative]
[sign changes]
μ-T
cro
ss-c
orre
latio
n
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Can we detect the local-form bispectrum?
Ganc & Komatsu (2012)
Sign
al-t
o-no
ise
/ fN
L
Sachs-Wolfe approximation
Full calculation (infinite resolution)
Full calculation (PIXIE’s resolution)
• No, unless fNL>>2300
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But, a modified initial state enhances the signal
Ganc & Komatsu (2012)
Sign
al-t
o-no
ise
69Occupation Number (=|βk|2)
60!maximum signal
more realistic estimate
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Future Work• All we did was to impose the following mode function
at a finite past:
• uk = [αk(1+ikη)e–ikη + βk(1–ikη)eikη]
• with the condition: βk -> 0 for k->∞
• However, it is desirable to construct an explicit model which will give explicit forms of αk and βk, so that we do not need to put an arbitrary model function at an arbitrary time by hand.
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Summary• A more insight into the single-field consistency relation
for the squeezed-limit bispectrum using in-in formalism.
• Non-Bunch-Davies vacuum can give an enhanced bispectrum in the k3/k1<<1 limit, yielding a distinct form of the scale-dependent bias.
• The μ-type distortion of the CMB spectrum becomes anisotropic, and it can be detected by correlating μ on the sky with the temperature anisotropy.
71
{
New
pro
bes
of in
itial
sta
te
of q
uant
um fl
uctu
atio
ns!
Squeezed-limit bispectrum = Test of single-field inflation
& initial state of quantum fluctuations