Post on 18-Jan-2021
Revisiting CDM isocurvature perturbationsin curvaton scenario
Naoya Kitajima
3rd Korea-Japan Workshop on Dark Energy, KASI, Daejeon Apr. 4-8 2016
NK, D. Langlois, T. Takahashi, S. Yokoyama in prep
Single field inflation models are tightly constrained
ns = 0.968± 0.006 (68% CL), r < 0.12 (95% CL)
Small field model or R2 model seem good..
(One of) the next-to-simplest setup(s)
inflaton + extra scalar field
- light & subdominant during inflation
- decays after inflation
=> acquires quantum fluctuations
“Curvaton” :
Enqvist & Sloth / Lyth & Wands / Moroi & Takahashi (2001)
V
V
m Hinf ,
multiple origin for perturbations
Cosmic history in curvaton scenario
inflaton
curvaton
curvaton decay
radiationH =
H = m
inflation MD RD
time
ener
gy d
ensit
y
- Large non-gaussianity- Isocurvature perturbations
/ a4
/ a3
- Non-gaussianity
(68%CL, Planck Collaboration 2015)
Curvaton model:
! severely constrained
Curvaton should dominate the universe before decayin order not to give too large fNL
rs & 0.2
adiabatic perturbation
space space
/
CDM
photon
isocurvature perturbation
Curvaton has “Residual” CDM isocurvature perturbation
space
curvaton
radiation CDM
photon
- Isocurvature perturbations
SCDM = 3(CDM )
/
“intrinsic” such as axion
Planck collaboration 1502.02114
Constraint on isocurvature perturbations
iso
=PS
P + PS
[95% CL]
Planck 2015 constraint :
|S/| . 0.1
iso
(k0
) < 0.035 (uncorrelated), iso
(k0
) < 0.013 (correlated)
curvaton model is constrained
I. WIMP dark matter
Weakly Interacting Massive Particle
CDM isocurvature perturbation in curvaton scenario
ann > H
ann < H
— DM is in thermal equilibrium
— DM is decoupled from thermal bath
creation/annihilation rate for DM : ann = hannvinCDM
Thermally produced WIMP
DM
DM
SM
SM
thermal bath10-20
10-15
10-10
10-5
100
10-2 10-1 100 101 102 103
m/T
Yeq
Y
nCDM = n(eq)CDM
- “Sudden” freeze-out formalism -
before freeze-out after freeze-out
H = ann = hannvinCDM at N = Nfr
CDM freezes out suddenly at
non-relativistic limit —
to calculate isocurvature perturbation
“Residual” CDM isocurvature perturbation
DM is non-relativistic at freeze-out :
T
ann / nCDM / em/T
H
nCDM T
time
SCDM = 3(CDM ) =(nCDM/s)
nCDM/s
timing is different in each patch
freeze-out
radiation+
CDMradiation
CDM
case 1 — CDM freeze-out after curvaton decay
- single component
before freeze-out after freeze-out
H = ann ) 3M2P
2ann = r(Nfr)
case 2 — CDM freeze-out before curvaton decay
(consistent with Lyth, Wands astro-ph/0306500)NK, Langlois, Takahashi, Yokoyama in prep
non-relativistic limit :
↵,fr d lnann
d lnT
fr
r + = 3M2P
2ann
radiation-curvaton fluid(2-component)
before CDM freeze-out
radiation+
CDM
Curvaton
- Case A
radiation+
CDM
Curvaton
radiation
CDMCurvaton
- Case A
after CDM freeze-out
T nCDM
radiation+
CDM
Curvaton
radiation
CDMCurvaton
Curvaton
radiation
CDM
- Case A
before curvaton decayafter CDM freeze-out
T nCDM
radiation+
CDM
Curvaton
radiation
CDMCurvaton
Curvaton
radiation
CDM
radiation
CDM
- Case A
after curvaton decayafter CDM freeze-out
T T nCDM
ruled out!
- Case B
Curvaton
radiation+ CDM
before CDM freeze-out
- Case B
Curvaton
radiation+ CDM
before CDM freeze-out
Curvaton
radiation
CDM
T nCDM
- Case B
Curvaton
radiation+ CDM
before CDM freeze-out
Curvaton
radiation
CDM
Curvaton
radiation
CDM
before curvaton decay
T nCDM
- Case B
Curvaton
radiation+ CDM
before CDM freeze-out
Curvaton
radiation
CDM
Curvaton
radiation
CDM
radiation
CDM
after curvaton decay
T nCDM T
ruled out??
rs 1
More realistic analysis
sudden decay approximationr
time
! r
r,inf + 4Hr,inf = 0
r,curv + 4Hr,curv =
r + 4Hr = 0
+ 3H = 0until decay
r !time
r,inf
r,curv
“dilution plasma”
it is not valid in some cases e.g. T-dependent decay rate
ΝΚ,Langlois,Takahashi,Takesakoand Yokoyama 1407.5148
(numerical analysis)
w/ dilution plasma
see e.g. Kolb & Turner
w/o dilution plasma :
curvaton
radiation r,curv r,inf
curvaton
radiationT
time
r,inf
r,curv
freeze-out nCDM r,inf
Primordial radiation vs dilution plasma
r,curv < r,inf
time
r,inf
r,curv
freeze-out nCDM r,curv
Primordial radiation vs dilution plasma
r,curv > r,inf
r,inf r,curv ) SCDM/ ' 0
Numerical calculations
(+ CDM annihilation)
N =
ZHdt, i = N +
1
3(1 + wi)ln
ii
-0.5
0
0.5
1
1.5
2
2.5
3
3.5
-14 -12 -10 -8 -6 -4 -2 0 2
−S
CD
M/ζ
Nfr−Ndec
numericalanalytic
w/o dilute gas
w/ dilute gasPreliminar
y
— Analytic & Numerical results —
r,curv > r,inf
NK, Langlois, Takahashi, Yokoyama in prep
Isocurvature vanishes if axion starts to oscillate after dilute gas exceeds primordial radiation
sudden freeze-out seems OK!
σ∗/Mpl
10-6
10-5
10-4
10-3
10-2
10-1
10-31
10-32
10-33
10-34
10-35
10-36
10-37
σ∗/Mpl
10-31
10-32
10-33
10-34
10-35
10-36
10-37
10-6
10-5
10-4
10-3
10-2
10-1
w/o dilution plasma w/ dilution plasma
tfr = tdectfr = tdec
tfr < tdec
rs > 0.1 rs > 0.1
|SCDM/| > 0.1
Preliminar
y
Preliminar
y
Allowed region is broadened for rs 1
Allowed parameter regionNK, Langlois, Takahashi, Yokoyama in prep
II. Axion dark matter
CDM isocurvature perturbation in curvaton scenario
— Axion dark matter —
axion
ma(T ) '(ma(Tcr/T ) for T > Tcr
ma for T < Tcr
ma(T ) '
8>>><
>>>:
4.05 1042QCD
Fa
T
QCD
3.34
T > 0.26QCD
3.82 1022QCD
FaT < 0.26QCD
QCD axion :
axion mass :
Fa = 109 1012 GeV, QCD ' 400 MeV
H = ma(Tosc
)
Hma(T )
T
time
“Sudden” beginning of oscillation at
na T
na
s
t>t
osc
=na(Tosc
)
s(Tosc
)
10-3
10-2
10-1
100
-10 -8 -6 -4 -2 0 2
N−Ndec
ΩσΩr
ΩrσW/WfH/ma
ma(T)/ma
W = nae3N
oscillation
SCDM
/ = 3
,osc
rs
3 +
4 + 2 ,osc 1
case 1 — Axion oscillation after curvaton decay
- single componentH = ma(Tosc
) ) 3M2
Pm2
a(Tosc
) = r(Nosc
)
case 2 — Axion oscillation before curvaton decay
r + = 3M2
Pm2
a(Tosc
)
(consistent with Lyth, Wands astro-ph/0306500)
Numerical calculations
N =
ZHdt, i = N +
1
3(1 + wi)ln
ii
a+ 3Ha+m2a(T )a = 0 (axion)
-0.5
0
0.5
1
1.5
2
2.5
3
3.5
-14 -12 -10 -8 -6 -4 -2 0 2
−S
CD
M/ζ
Nosc−Ndec
rs = 0.999analytic
Preliminar
y
analytic & numerical results
Isocurvature vanishes if axion starts to oscillate after dilute gas exceeds primordial radiation
NK, Langlois, Takahashi, Yokoyama in prep
10-6
10-4
10-2
100
102
10-8 10-7 10-6 10-5 10-4 10-3 10-2 10-1
Γ σ/m
a
σi/MP
Preliminar
y
Allowed parameter region
tfr = tdec
rs > 0.1
|SCDM/| > 0.1
Allowed region is broadened for rs 1
NK, Langlois, Takahashi, Yokoyama in prep
— Summary —
We revisited isocurvature perturbations in curvaton model.“Residual” CDM isocurvature perturbations can be produced in this model In previous thought, it becomes large (S/ζ = -3 — -3/2) and it is already ruled out by observations unless CDM produced after curvaton decay.
Detailed analysis beyond sudden decay approximation (including dilution plasma from gradual decay of the curvaton) shows that CDM isocurvature can be suppressed even if curvaton decays after CDM production (freeze-out of WIMP/beginning of axion oscillation).
constraint from isocurvature is relaxedgood news or bad news?