Santiago Casas
Cosmologist, Physicist, Data Scientist.
What will Large Scale Structure tell US about Dark Energy in the NEXT DECADE?
Santiago Casas
Postdoctoral Researcher
TTK, RWTH Aachen University
@santiagocasas @sant87casas
https://www.esa.int/Science_Exploration/Space_Science/Euclid/Euclid_test_images_tease_of_riches_to_come
Do galaxies just randomly spread out across the sky?
https://www.esa.int/Science_Exploration/Space_Science/Euclid/Euclid_test_images_tease_of_riches_to_come
No they do not, there is actually a 2-point correlation (and higher orders) among them
Expresses the excess probabilty of finding another galaxy as a function of scale
Strong hint that some physical mechanism is at play
https://www.esa.int/Science_Exploration/Space_Science/Euclid/Euclid_test_images_tease_of_riches_to_come
Shape and orientation of galaxies is also correlated -- due to Weak Gravitational Lensing -- and this tells us about (dark) structures in the Universe
Euclid Space Satellite
ESA class M2 space mission, Launched 1st July 2023 with a SpaceX Falcon9 rocket
Credits: www.esa.int/Science_Exploration/Space_Science/Euclid, www.euclid-ec.org, ESA/NASA/SpaceX, Euclid Consortium
Sun-Earth Lagrange point 2, 1.5 million km from Earth
Euclid consortium scientist visits Cannes. Credits: ThalesAlenia Space
The Euclid Consortium fingertip galaxy, thanks to the contribution of many scientists within the EC, courtesy of Lisa Pettibone, Tom Kitching and ESA
Euclid Space Satellite
- Two instruments:
- VIS (visible photometer): shape and orientation of ~1 billion galaxies!
- NISP (near infrared spectrograph): ~20 million galaxy spectra !
- 6 years nominal mission
- 15 000 square degrees in the sky
- 16 countries, ~1500 members
- ~170 Petabyte of data!
VIS cosmic shear map
https://www.euclid-ec.org/blog/
Euclid preparation: I. The Euclid Wide Survey of ESA, R. Scaramella et al.
VIS cosmic shear map
Vera Rubin LSST
- Located in Chile, 8.4m telescope
- 3.2 Gigapixel camera!
- 20 billion galaxies
- Redshifts: 0 < z ~< 3 (photometric)
- 18,000 square degrees
- 11 years of observation
- 3x2pt, clusters, SNIa and more!
By LSST Project Office - http://www.lsst.org/gallery/telescope-rendering-2013, CC BY-SA 4.0, https://commons.wikimedia.org/w/index.php?curid=42054166
Vera Rubin LSST
DESI telescope
- 14 000 square degrees in the sky
- 20-40 million accurate spectra
- Redshifts: 0 < z < 2 (spectroscopic)
- Quasars up to z~3.5
- 5 years of observation
- Starting 2021
- Power spectra, Bispectra, Corr. Func.
Just 7 months of DESI data
5000 robotically controlled optical fibers
Tucson, Arizona, in the Schuk Toak District on the Tohono O’odham Nation
Credits: https://www.desi.lbl.gov
Just 7 months of DESI data
Vera Rubin LSST
Square kilometer array (SKAO)
- SKA Phase 1: SKA1-Low and SKA1-Mid
- SKA1-Low: 130,000 dipole antennas, 65km max. baseline (Australia)
- SKA1-Mid: ~200 dishes of ~15m diameter, max. baseline 150km (South Africa)
- Precursors: ASKAP, MEERKAT, HERA...
- €1.3 Billion, 16 countries, 710 Petabytes, 8 years construction
https://www.skao.int/
https://www.esa.int/Science_Exploration/Space_Science/Euclid/Euclid_test_images_tease_of_riches_to_come
With Stage-IV surveys we will have \(\approx 10^9\) galaxy shapes with photometric (approximate) and \(\approx 10^6\) (precise) redshifts and positions
Only 1/64th of the complete Euclid field of view is represented here, which in turn is equivalent to a mere quarter of the apparent size of the Moon. Consider the vast expanse of 15,000 square degrees, encompassing one-third of the entire sky!
So, we Basically KNOW:
How to measure:
-
Positions of galaxies in the sky (angles)
-
Redshifts of galaxies (photo or Spectro)
-
Shapes (ellipticities of galaxies)
HUGE Scale StructureS
Illustris Simulation: www.nature.com/articles/nature13316
However, the Universe is not as nice and simple. It is a non-linear mess:
Dark Matter
Baryons
Other Large Scale Structure Probes I WOn't MENTION IN THIS TALK:
-
CMB LEnSING and ITS Cross-Correlation with LSS
-
Cosmic VOIDS
-
NON-Gaussian and HIGHER ORDER STatistics
-
CLUSTERS of GALAXIES
- ....
The Standard \(\Lambda\)CDM model
G_{\mu \nu} + \Lambda g_{\mu \nu} = 8\pi G T_{\mu \nu}
- \(\Lambda\)CDM is still best fit to observations.
- Some questions remain:
- \(\Lambda\) and CDM.
- CDM hasn't been found directly
- Cosmological Constant Problem:
Quantum Gravity?
O(100) orders of magnitude wrong
(Zeldovich 1967, Weinberg 1989, Martin 2012).
Composed of fine-tuning, hierarchy and coincidence
sub-problems, among others.
String Theory Landscape?
68% Dark Energy
5% Baryons
27% Dark Matter
The expansion History
The expansion History
\(\phi\) ?
baryogenesis? \(_3^7\textrm{Li}\)?
H0 tension?
z_reio?
\(\Lambda\) ?
DM? PBH ?
Tensions IN \(\Lambda\)CDM
\(H_0\) tension at 5\(\sigma\)
- Tensions between local and recombination-based measurements
Freedman et al
SH0ES, Riess et al
Planck 2018, VI
Tension with Planck in the
\(\sigma8\) - \(\Omega_m\) plane
Lange et al. arXiv: 2301.08692
- \( S_8 = \sigma_8 \sqrt{\Omega_{m,0}/0.3} \)
- So called "lensing is low" problem or S8 problem.
- At the moment just a discrepancy (no tension) at 2-3 \(\sigma\)
- Blind comparisons among surveys can rule out usual systematics below z<0.54 (A. Leauthaud et al.)
- Beyond \(\Lambda\)CDM modelling does not help with current nonlinear analysis
Planck 2018, VI
DES DRY3 arxiv:2207.05766
Tensions IN \(\Lambda\)CDM
We have many problems/Mysteries in cosmology
BUT let's focus on a classical one
why is the universe accelerating?
(assuming we don't like \(\Lambda\))
First Step: Modify Gravity
Ezquiaga, Zumalacárregui, Front. Astron. Space Sci., 2018
Modified Gravity and Dark Energy
- Add a scalar degree of freedom to the Einstein-Hilbert action
- (Non-)Minimal coupling, Kinetic terms
a SCALAR-tensor theory
Gregory Horndeski
https://www.horndeskicontemporary.com/works
Costa Rica - Arenal Volcano
- Horndeski theory: most general theory for an extra scalar degree of freedom, with second order equations of motion in 4D and no ghosts
- 5 Lagrangian terms, which have been largely ruled out by:
- Late-ISW
- GW170817
- No self-acceleration -> uninteresting?
Gregory Horndeski
https://www.horndeskicontemporary.com/works
Dynamical Dark Energy
- Dark Energy: Any dynamical cause for the accelerated expansion.
Euclid was commissioned to test with observations the most common parametrization (CPL):
And possible deviations of the growth of structures
M. Chevallier and D. Polarski (2001), and E. Linder (2003),
Cosmology and Fundamental Physics with the Euclid Satellite (Amendola et al , Living Reviews in Relativity, 2018)
Dynamical Dark Energy
- Current bounds from CMB and LSS alone
- \(\mathcal{O}(1)\) for \(w_0\) combining Planck+GC+WL+SNIa
- \(\mathcal{O}(0.01)\) with Euclid
- Here: Flat \(w_0 w_a\mathrm{CDM}\)
- GCsp+WL+GCph+XC
- Figure of Merit (~inverse area of ellipse):
1257 (flat) - Non-flat FoM:
500 - Optimistic flat:
\(\sigma_{w_0}=0.025\)
\(\sigma_{w_a}=0.092\)
Euclid preparation: VII. Forecast validation for Euclid cosmological probes, Blanchard et al. arXiv:1910.09273
Awardees of the Euclid STAR Prize Team 2019
Dynamical Dark Energy
- Current bounds from CMB and LSS alone
- \(\mathcal{O}(1)\) for \(w_0\) combining Planck+GC+WL+SNIa
- \(\mathcal{O}(0.01)\) with Euclid
- Here: Flat \(w_0 w_a\mathrm{CDM}\)
- GCsp+WL+GCph+XC
- Figure of Merit (~inverse area of ellipse):
1257 (flat) - Non-flat FoM:
500 - Optimistic flat:
\(\sigma_{w_0}=0.025\)
\(\sigma_{w_a}=0.092\)
Awardees of the Euclid STAR Prize Team 2019
Euclid preparation: VII. Forecast validation for Euclid cosmological probes, Blanchard et al. arXiv:1910.09273
Dynamical Dark Energy + Neutrinos
Euclid: Validation of the MontePython forecasting tools, 2303.09451 , SC, Lesgourgues, Schöneberg, et al.
- Validated IST:F Fisher forecasts against MCMCs with
MontePython-> Gaussian posteriors for \(w_0, w_a\)
Euclid Preparation: Sensitivity to Neutrino parameters. (Under internal review). Archidiacono, Lesgourgues, SC, Pamuk, et al.
EUCLID PRELIMINARY
- Including \(m_{\nu} \, , \, N_{\rm eff}\) posteriors for \(w_0, w_a\) are not so Gaussian anymore. Use more "realistic" settings:
- \(\sigma_{w_0} \approx 0.04\)
\(\sigma_{w_a} \approx 0.14\) - With cluster counts + Planck
- \(\sigma_{w_0} \approx 0.02\)
\(\sigma_{w_a} \approx 0.08\), - \( m_{\nu} \approx 60 \pm 40 \, \rm{ meV}\)
Dynamical Dark Energy
Wolf, Ferreira 2310.07482
Problems with Dynamical DE CPL parametrization:
- It is just a first order Taylor expansion around \(a=1\)
- It is underdetermined, prior- and data-dependent
- parts of \( w_0 - w_a \) space do not match any meaningful model
- Many physical Quintessence models can recover same parameters even if we find \( w_0 \neq -1 , w_a \neq 0 \)
Raveri et al, 2107.12990
Parametrized modified gravity
\rm{d}s^2 = -(1+2\Psi) \rm{d}t^2 + a^2(1-2\Phi) \rm{d}x^2
Beyond \(\Lambda\)CDM the two linear gravitational potentials \(\Psi\) and \(\Phi\) are not equal to each other
We can describe general modifications of gravity (of the metric) at the linear perturbation level with 2 functions of scale (\(k\)) and time (\(a\))
\Sigma(a,k) = \frac{1}{2}\mu(a,k)(1+\eta(a,k))
Only two independent functions!
Parametrized approach for perturbations:
Parametrized modified gravity
- Using Planck satellite data in 2015 and 2018, constraints were obtained on these two functions \(\mu\) and \(\eta\).
- Late-time parametrization: dependent on Dark Energy fraction
Planck 2018 results VI, arXiv:1807.06209
Planck 2015 results XIV, arXiv:1502.01590
Planck alone relatively unconstrained: 100-500% errors
Parametrized modified gravity
Forecasts for Stage-IV : Euclid, DESI, SKA1, SKA2, only GC and WL
SC, Kunz, Martinelli, Pettorino, Phys.Dark Univ. 18 1703.01271
- Study more general case of free \(\mu\), \(\eta\) functions at each bin
- Non-linearities crucial for constraints
- Z-PCA decorrelation
- Constraints on \(\mu\), \(\eta\) of O(10%)
- For late-time and early-time scenario:
Constraints on \(\mu\), \(\eta\) of O(3%) - When combining GC+WL+Planck priors
Vera Rubin LSST
Radio x Optical Cosmology
SC, Carucci, Pettorino et al (2022) 2210.05705
- WL is better at measuring \(\Sigma\) (40% relative error)
- GC is better at measuring \(\mu\) (20% relative error)
- SKAO-all-probes constrains at 3-5% relative error
- At Planck best fits
- DESI(GCsp)xSKAO(IM) helps in \(h, \sigma_8\) but not in MG parameters
- Combination of SKAO + one Stage-IV probe is as good as two Stage-IV
- Different noise and systematics -> break degeneracies
Classifying by screening
- Modified Gravity theories should recover GR at small scales, especially in dense regions, screening needed!
Brax, SC, Desmond, Elder 2201.10817, Universe 8 (2021), Review: Testing Screened Modified Gravity
G_{\rm eff}=\left(1+ \frac{2\beta^2(\phi_0)}{Z(\phi_0)}e^{-m(\phi_0)r}\right) G_N
- Perturbations of \(\phi\) and matter coupled in Jordan frame -> Yukawa-like fifth forces:
Different types of screening:
- Chameleon: The mass \(m(\phi_0)\) increases sharply inside matter
- Damour-Polyakov: The coupling \(\beta(\phi_0)\) vanishes inside matter
- K-mouflage and Vainshtein: \(Z(\phi_0) \gg 1\)
Classifying by screening
Screening mechanisms can be characterized by the inequality:
\nabla^k \Phi_N \gtrsim C
- Chameleon: \(k=0\) (surface N. potential is large)
- K-mouflage: \(k=1\) (N. acceleration is large)
- Vainshtein: \(k=2\) (curvature is large)
- \( f(R) \) Hu-Sawicki (see later)
- \(k\)-essence + univ. coupling
- nDGP (3+1)d brane embedded in 5d
For DE applications and under some assumptions:
- Chameleon screens everything above a certain potential threshold
- K-mouflage does not screen galaxy clusters
- Vainshtein screens all structures that turn non-linear
Brax, SC, Desmond, Elder 2201.10817, Universe 8 (2021), Review: Testing Screened Modified Gravity
Text
SC et al, Euclid: Constraints on f(R) cosmologies from the spectroscopic and photometric primary probes, 2306.11053
f(R) Hu-Sawicki model
\newcommand{\sg}{\ensuremath{\sigma_{8}}}
\newcommand{\de}{\mathrm{d}}
S = \frac{c^4}{16\pi G} \int{\de^4 x \sqrt{-g} \left[R+f(R)\right]}
-k^2\Psi =\frac{4\pi\,G}{c^4} \,a^2\mu\bar\rho\Delta\,
Modification of the Einstein-Hilbert action
-k^2\left(\Phi+\Psi\right) = \frac{8\pi\,G}{c^4}\,a^2 \Sigma \bar\rho\Delta
Induces changes in the gravitational potentials *
\mu(a,k) = \frac{1}{1+f_R(a)}\frac {1+4k^2a^{-2}m_{f_R}^{-2}(a) }{1+3k^2a^{-2}m_{f_R}^{-2}(a)}
Scale-dependent growth of matter perturbations
Small changes in lensing potential
\Sigma(a)=\frac{1}{1+f_{R}(a)}\,
*for negligible matter anisotropic stress
Free parameter: \(f_{R0}\)
f(R) = - 6 \Omega_{\rm DE} H_0^2 + |f_{R0}| \frac{\bar R_0^2}{R}\,
\(\lambda_C =32 \rm{Mpc}\sqrt{|f_{R0}|/10^{-4}}\)
"Fifth-force" scale for cosmological densities
Hu, Sawicki (2007)
Text
f(R) Hu-Sawicki model
Codes used: for background and scale-dependent linear perturbations: MGCAMB and EFTCAMB
Non-linear matter power spectrum:
Winther et al (2019) fitting formula
Scale-dependent growth, change in forecasting pipeline
Current Euclid KP-JC6-SP paper in preparation (ledy by Kazuya), investigating biasing by Emulators/ReACT compared to simulations
SC et al, Euclid: Constraints on f(R) cosmologies from the spectroscopic and photometric primary probes, 2306.11053
Text
f(R) Hu-Sawicki model
\(\sigma_{\log f_{R0}}=0.05\) (1%)
Current cosmological limits ~approx:
\( |f_{R0}|<10^{-6}\)
Full probe combination, optimistic Euclid constraints:
\(f_{R0}=(5.0^{+ 0.58}_{-0.52} \times 10^{-6})\)
Paper also contains impact of:
- Non-linear scales
- Cross-correlations
- Pessimistic settings
- LCDM-limit (numerical)
SC et al, Euclid: Constraints on f(R) cosmologies from the spectroscopic and photometric primary probes, 2306.11053
Text
Scale-independent Modifications of GR
Forecasts for:
- Jordan-Brans-Dicke (no-screening)
- nDGP (5D brane model)
- k-Mouflage
- We work mostly in QSA MGCAMB or hiclass and non-linear modelling: Halo model or fits to simulations
Fruciante, Pace, Cardone, SC et al, Euclid: Constraining linearly scale-independent modifications of
gravity with the spectroscopic and photometric primary probes, 2306.12368
Current cosmo bounds \(\omega_{BD} \gtrapprox 1000 \), GR: \(\omega_{BD} \rightarrow \infty \)
\(r_c = G_5 / 2G_N \, , \Omega_{rc} \equiv c^2 / (4 r_c^2 H_0^2 ) \)
Current cosmo bounds \(\Omega_{rc} \lessapprox 0.27 \), GR: \(r_{c} \rightarrow \infty \)
Vary just \(\epsilon_{2,0}\) which in the limit \(\epsilon_{2,0} \rightarrow 0 \) turns the Kinetic term into a cosmological constant
Current cosmo bounds \( −0.04 \lessapprox \epsilon_{2,0} \lessapprox 0\)
Perform forecasts for limits close-to and far-from LCDM
Text
Scale-independent Modifications of GR
Example of result for JBD \(\sigma(\log \omega_{BD}) \):
(other results see paper)
Fruciante, Pace, Cardone, SC et al, Euclid: Constraining linearly scale-independent modifications of
gravity with the spectroscopic and photometric primary probes, 2306.12368
Full Euclid:
- JBD1: \(\omega_{BD} = 800 ^{+200}_{-160}\)
- JBD1: \(\omega_{BD} = 2500 ^{+1070}_{-750}\)
other models (To Be tested) with STAGE-IV
SC, Rubio, Pauly et al (2017) 1712.04956
Higgs-Dilaton inflation: early-late Universe connection
Model-independent anisotropic-stress \(\eta\)
Amendola, Pinho, SC 1805.00027
SC, Amendola, Baldi, Pettorino et al 1508.07208
Coupled Quintessence: DM-DE
Surviving Horndeski EFT
Frusciante, Peirone, SC, Lima, 1810.10521, Phys.Rev.D 99
Text
Growing Neutrino Quintessence
SC, Pettorino, Wetterich 1608.02358
how do we do these forecasts again?
photometric primary probe
Directly constrains MG function \(\Sigma\) through Weyl potential
-k^2(\Phi(a,k)+\Psi(a,k)) \equiv 8\pi G a^2 \Sigma(a,k)\rho(a)\delta(a,k)
P_{\delta \delta} \rightarrow \Sigma^2 P_{m}
spectroscopic probe
BAO
Clustering
RSD
Spec-z
Euclid will also measure the 2pt corr-func of spectroscopic galaxies in redshift space
Euclid preparation: VII. Forecast validation for Euclid cosmological probes, Blanchard et al. arXiv:1910.09273
spectroscopic probe
Rademacher, Linde, Lesgourgues, Moradinezhad, SC in prep.
The more-realistic GCspectro model, based on Senatore, Ivanov, Simonovic, Vlah, et al
CLASS 1-loop Code in development
PRELIMINARY
1-loop PT of density and velocity in redshift space
4 counterterms, 4 shot-noise, 4 higher-order biases
Trade-off: larger error bars, more accuracy, less biasing
- In MG -> much more complicated (Kernels, Einstein-de-Sitter approx., screening, RSD)
PyBird, PBJ, Fast-PT- In Euclid:Bose et al (in prep.) we show that for conservative Euclid error bars, approximations are fine in terms of \(\chi^2\), for f(R), DGP, ...
Vera Rubin LSST
Square kilometer array (SKAO)
- Modelling is very analogous to GCsp, with brightness temperature on top and different biases
- GCsp-IM Cross-correlation in overlapping bins
- DESI : Two galaxy samples
- SKAO: HI Galaxies and 21cm-IM
\(P^{\rm IM}(z,k) = \bar{T}_{IM}(z)^2 \rm{AP}(z) K_{\rm rsd}^2(z, \mu; b_{\rm HI}) \)
\(FoG(z,k,\mu_\theta) \\ \times P_{\delta\delta,dw}(z,k) \)
\( K_{\rm rsd}(z, \mu; b_{\rm HI}) = [b_{\rm HI}(z)^2+f(z)\mu^2] \)
\( b_{\rm HI}(z) = 0.3(1+z) + 0.6 \)
\( \bar{T}_{\mathrm{IM}}(z)= 189h \frac{(1+z)^2 H_0}{H(z)}\Omega_{HI}(z) \,\,{\rm mK} \)
\(\Omega_{HI} = 4(1+z)^{0.6} \times 10^{-4} \)
Carucci et al (2020) 2006.05996
Jolicoeur et al (2020) 2009.06197
\(P^{{\rm IM} \times \rm{g}}(z,k) = \bar{T}_{\rm IM}(z) {\rm AP} (z) r_{\rm IM,opt} K_{\rm rsd}(z, \mu; b_{\rm HI}) \)
\( \times K_{\rm rsd}(z, \mu; b_{\rm g}) FoG(z,k,\mu_\theta) P_{\delta\delta,dw}(z,k) \)
\( \times \exp[-\frac{1}{2} k^2 \mu^2 (\sigma_{\rm IM}(z)^2+\sigma_{\rm sp}(z)^2)] \)
SC, Carucci, Pettorino et al (2022) 2210.05705
Brightness temperature of 21cm emission line
Fraction of neutral hydrogen in the Universe
CosmicFish Code
Code: CosmicFish
S.Casas, M.Martinelli and M.Raveri
Soon to be released: New full pythonic version
Fisher Information Matrix:
Curvature (Hessian) of the Likelihood
Example: Fisher Matrix for a Gaussian likelihood of angular power spectra:
Euclid: Likelihood and Nonlinear Challenges
- GCspectro: EFT 1-loop RSD in multipoles
- 3x2pt photo:
- Covariance, nonlinear Super-Sample
- Bias expansion
- Emulators for nonlinear, HMCode, Halofit, Bacco, EuclidEmu
- Baryonic Feedback
- Different emulators with systematic offsets
- Euclid error bars can distinguish among them
- Biases in parameter estimation to be resolved
EUCLID PRELIMINARY
Credit: P. Carrilho
Credit: SC, for IST:NL
Cosmological Likelihood for Observables in Euclid
machine Learning and variational methods
- In era of Big Data (billions of raw data points) and hundreds of possible models and simulations:
- Important to be as computationally efficient as possible
- Important to be as computationally efficient as possible
- Likelihood codes for Euclid 2-3s per evaluation, Einstein-Boltzmann codes 1-100 seconds (depending on model -> too slow!!
- Automatic-Differentiable (AD) codes: Leverage variational methods, such as Hamilton MC, AD-Variational Inference, Exact Fisher and beyond
In collaboration with Johanna Schaffmeister and Sven Günther
jaxcosmo library https://github.com/DifferentiableUniverseInitiative
Campagne, Lanusse, Zuntz, SC, et al, 2302.05163
Text
Conclusions
- \(\Lambda\)CDM paradigm still best fit to observations, but tensions, unknowns and discrepancies start to show cracks in the model.
- Several avenues of research important: Modified Gravity, cosmological Neutrinos, Early-Late time interaction.
- Stage-IV surveys, infrarred, optical and radio will improve error bars by one order of magnitude.
- Theoretical modelling (especially at non-linear scales) has to keep up with accuracy.
- Big Data challenge to be resolved with ML and AI
- Unknown unknowns awaiting for us in the data !
Merci!!
BACKUP
Cosmic Microwave Background
Planck 2018 CMB Temperature map (Commander) . wiki.cosmos.esa.int/planck-legacy-archive/index.php/CMB_maps
What happened in between, if in its infancy it was a fairly Gaussian, linearly perturbed, homogenous and isotropic Universe?
the road ahead of horndeski
The "surviving Horndeski" Lagrangian:
In the EFT formalism, FLRW, linear and
(unitary gauge time \(\rightarrow \phi\) ) :
Parametrize free functions and check for stability in solutions
We have shown that certain classes of models will not be distinguishable from LCDM, even with future surveys, at 1\(\sigma\), while others will be measured with 10%-60% precision in their parameters
Frusciante, Peirone, SC, Lima, 1810.10521, Phys.Rev.D 99
In this 2-point correlation function we can see geometric features that are directly related to the expansion history of the Universe
Credits: Tobias Liaudat, CosmoStat
Euclid Shape Pipeline
Credits: Rodlophe Cledassou, CNES
Euclid
Big bang nucleosynthesis
doi: 10.1146/annurev.nucl.012809.104521
Age of the Universe
Temperature of the Universe
Cosmic microwave background
- Planck measurements, essentially cosmic-variance limited in TT
- Percent precision in cosmological parameters
- Degeneracies in \(\Omega_k\), \(\Omega_m\) and \(H_0\) broken with BAO and lensing
- \(H_0 = 67.37 \pm 0.54 \, \textrm{km/s/Mpc}\)
Planck 2018 results. VI. Cosmological parameters https://arxiv.org/abs/1807.06209
https://www.cosmos.esa.int/web/planck
Possible solutions and new directions
- \(\Lambda\) ?
- Inflation ?
- \(m_{\nu}\) ?
- LSS ?
- Big data?
Outline of working fields
- Coupled Quintessence
- Higgs-Dilaton
- Modified Gravity
- Horndeski/EFToDE
- EFToLSS
- Emulators
- Machine Learning
- Variational inference
- Stage-IV surveys
Radio and Optical
Galaxy Clustering and Cosmic Shear
Weak gravitational lensing
Galaxy Clustering
Orientation and ellipticities
Angles and redshifts
Supernovae Type Ia and Local H0
- In general: confidence on the distance ladder
- Concerns on calibration, anchors dust or
metallicity, have basically
faded out - Riess et al 2022*:
\(H_0 = 73.30 \pm 1.04 \, \textrm{km/s/Mpc}\)
using Cepheids and
high-z SNIa
* The Astrophysical Journal Letters, 934:L7 (52pp), 2022 July 20
Neutrinos Masivos en Cosmologia
Neutrinos masivos: Free streaming
CMB angular spectrum and matter power spectrum are both dependent on neutrino mass, N_eff and ordering
Linear Perturbations
Vlasov-Poisson system is a set of diff.eqn. in which all matter-radiation species are coupled
Slides by: Dennis Linde
https://www.pablocarlosbudassi.com/2021/02/the-infographic-and-artistic-work-named.html
Fisher Matrix Forecasts
Euclid preparation: VII. Forecast validation for Euclid cosmological probes. arXiv:1910.09273
Bayes Theorem:
Probability of the model parameters given the data
Fisher Information Matrix:
Curvature (Hessian) of the Likelihood
Gaussian Likelihood in data space:
-2\ln {L}({\bm x}|{\bm\theta})=\left({\bm x}-{\bm \mu}({\bm\theta})\right)^t{ C}^{-1}\left({\bm x}-{\bm \mu}({\bm\theta})\right)
How do we actually perform those forecasts?
J. Schaffmeister
Fisher Matrix Forecasts
Euclid preparation: VII. Forecast validation for Euclid cosmological probes. arXiv:1910.09273
Fisher Matrix for a Gaussian likelihood of angular power spectra:
Parameter covariance:
Defines an ellipse:
f(R) Hu-Sawicki model
Text
Modification of the Einstein-Hilbert action
\newcommand{\sg}{\ensuremath{\sigma_{8}}}
\newcommand{\de}{\mathrm{d}}
S = \frac{c^4}{16\pi G} \int{\de^4 x \sqrt{-g} \left[R+f(R)\right]}
Induces changes in the gravitational potentials *
*for negligible matter anisotropic stress
-k^2\Psi =\frac{4\pi\,G}{c^4} \,a^2\mu\bar\rho\Delta\,
-k^2\left(\Phi+\Psi\right) = \frac{8\pi\,G}{c^4}\,a^2 \Sigma \bar\rho\Delta
Scale-dependent growth of matter perturbations
Small changes in lensing potential
\mu(a,k) = \frac{1}{1+f_R(a)}\frac {1+4k^2a^{-2}m_{f_R}^{-2}(a) }{1+3k^2a^{-2}m_{f_R}^{-2}(a)}
\Sigma(a)=\frac{1}{1+f_{R}(a)}\,
Free parameter: \(f_{R0}\)
f(R) = - 6 \Omega_{\rm DE} H_0^2 + |f_{R0}| \frac{\bar R_0^2}{R}\,
Hu, Sawicki (2007)
"Fifth-force" scale for cosmological densities
\(\lambda_C =32 \rm{Mpc}\sqrt{|f_{R0}|/10^{-4}}\)
Euclid: Casas et al (2022) in preparation
f(R) Hu-Sawicki model
Text
Euclid: Casas et al (2022) in preparation
Codes used: for background and scale-dependent linear perturbations: MGCAMB and EFTCAMB
For non-linear power spectrum:
Winther et al (2019) fitting formula
Pascal - LSS - DE
By Santiago Casas
Pascal - LSS - DE
Cosmology Seminar for JC
