L2: The Cosmic Microwave Background & the Fluctuation History of the Universe & the Basic Cosmological Parameters Dick Bond.

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Presentation transcript:

L2: The Cosmic Microwave Background & the Fluctuation History of the Universe & the Basic Cosmological Parameters Dick Bond

The CMB shows the hot big bang paradigm holds, with: SPECTRUM: near-perfect blackbody. no big energy/entropy injection at z< (cosmic photosphere). Limits hydro role in structure formation CMB comes from afar (also Sunyaev-Zeldovich Effect from distant clusters … z>0.8) CMB dipole: 300 km/s earth flow, 600 km/s Local Group flow TO SHOW: gravitational instability, hierarchical Large Scale Structure, predominantly adiabatic mode a “dark age” from hydrogen recombination (z  1100) to reionization (z~10-20) (nearly) Gaussian initial conditions The CMB shows the hot big bang paradigm holds, with: SPECTRUM: near-perfect blackbody. no big energy/entropy injection at z< (cosmic photosphere). Limits hydro role in structure formation CMB comes from afar (also Sunyaev-Zeldovich Effect from distant clusters … z>0.8) CMB dipole: 300 km/s earth flow, 600 km/s Local Group flow TO SHOW: gravitational instability, hierarchical Large Scale Structure, predominantly adiabatic mode a “dark age” from hydrogen recombination (z  1100) to reionization (z~10-20) (nearly) Gaussian initial conditions

~30  K ~10 ppm ~30  K ~10 ppm ~3 mK ~1000 ppm ~3 mK ~1000 ppm

WMAP3 thermodynamic CMB temperature fluctuations Like a 2D Fourier transform, wavenumber Q ~ L + 1/2

Primary Anisotropies Tightly coupled Photon-Baryon fluid oscillations Linear regime of perturbations Gravitational redshifting Decoupling LSS Secondary Anisotropies Non-Linear Evolution Weak Lensing Thermal and Kinetic SZ effect Etc. 19 Mpc reionization 14Gyrs 10Gyrs today the nonlinear COSMIC WEB

~ 0.1 ((1+z re )/15)) 3/2  b h 2 /.02) (  c h 2 /.15) -1/2  C = int _now^ z n e  T c dt  b h 2 =  c h 2 =   =  C = (.005 PL1) Compton depth differential visibility d exp(-  C ) / dln a nearly Gaussian pulse at z ~ 1100, width  z~100, t~ yr Small bump falling off from z ~ 10, with  C ~ 0.1 z reh =

CBI: Tony Readhead (PI), B. Mason, S. Myers, T. Pearson, J. Sievers, M. Shepherd, J. Cartwright, S. Padin, P. Udomprasert + CITA/CIAR gp (+ DASI gp)

Multipole L p o w er CBI Boom2002 CBI Boom2002

: : nonlinear Cosmic Web resolution P(ln k) dynamics H(ln a) are related in inflation (HJ) ~10+ e-folds dynamics w(ln a) ~1+ e-folds

Natural pertubation modes in an expanding flat universe are 3D Fourier waves Sound waves! alternating between hot & cold if we sit & watch. long waves are slow, short waves are fast. Everybody started at same time, and we see them all at one time. Makes a characteristic pattern of waves on the sky.

Planck distribution function f = 1/(exp[q/(aT)] -1) Planck distribution function f = 1/(exp[q/(aT)] -1) d Number of photons = f d Phase Space Volume = f 2 d 3 q/(2  ) 3 d 3 x d Number of photons = f d Phase Space Volume = f 2 d 3 q/(2  ) 3 d 3 x Thermodynamic temperature T(q) from f(q) Sources, sinks, scattering processes Time derivative along the photon direction

 f /  t| q + q   f – GR term = aS[f] Green function is a delta function of a null geodesic Picture is photons propagate freely in the curved (fluctuating) geometry, periodically undergoing small scale Thompson scattering Regimes: tight coupling (of baryons and photons) free-streaming Sources probed via the differential visibility  f /  t| q + q   f – GR term = aS[f] Green function is a delta function of a null geodesic Picture is photons propagate freely in the curved (fluctuating) geometry, periodically undergoing small scale Thompson scattering Regimes: tight coupling (of baryons and photons) free-streaming Sources probed via the differential visibility Photon Transport in Perturbed Geometry Coupled linearized equations for photons (with polarization) baryons, dark matter, neutrinos, and metric variables Modes: scalar (curvature or isocurvature), vector, tensor

Output: transfer functions for dark matter and baryons to map initial power spectrum to pre-nonlinear one (ICs for numerical simulations) & of course C L Output: transfer functions for dark matter and baryons to map initial power spectrum to pre-nonlinear one (ICs for numerical simulations) & of course C L

NSF/Caltech/C ITA/CIAR May 23,2002 AAS Jun02 Grand unified spectrum Adds CBI mosaic +CBI deep +VSA NSF/Caltech/C ITA/CIAR May 23,2002 AAS Jun02 Grand unified spectrum Adds CBI mosaic +CBI deep +VSA 5 moons across X moons X 3

CBI Image of CMB Anisotropies WMAP CBI – much smaller scale. But not all- sky.

Wilkinson Microwave Probe (WMAP) – launch June 2001, 1 year data release – Feb 11, 2003, 3 year data release – Mar 16, frequency channels at GHz 3 year data – sky is covered six times Each pixel observed ~27000 times. Cosmic variance limited up to l~ % calibration uncertainty

WMAP3 thermodynamic CMB temperature fluctuations

WMAP3 cf. WMAP1

WMAP3 sees 3 rd pk, B03 sees 4 th

CBI combined TT sees 5 th pk (Dec05,~Mar06)