Combining cluster number counts and galaxy clustering

Fabien Lacasa; Rogerio Rosenfeld

doi:10.1088/1475-7516/2016/08/005

Observations of Faint Field Galaxies

Symposium - International Astronomical Union ◽

10.1017/s0074180900136071 ◽

1988 ◽

Vol 130 ◽

pp. 221-227

Author(s):

David C. Koo

Keyword(s):

Preliminary Analysis ◽

Galaxy Clustering ◽

Angular Correlations ◽

Blue Galaxies ◽

Number Counts

Number counts, colors, and angular correlations of field galaxies fainter than 20th mag are summarized. Resulting conclusions regarding the presence and nature of luminosity, spectral, and clustering evolution remain controversial. Preliminary analysis of two major spectroscopic surveys near completion suggests that by z ∼ 0.5, larger numbers of very-blue galaxies of moderate luminosities are found than today. These skewer-like surveys also provide new probes of galaxy clustering on scales previously unexplored (>200 Mpc) and over lookback times of several billion years.

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Calibrating cluster number counts with CMB lensing

Physical Review D ◽

10.1103/physrevd.95.043517 ◽

2017 ◽

Vol 95 (4) ◽

Cited By ~ 14

Author(s):

Thibaut Louis ◽

David Alonso

Keyword(s):

Cluster Number ◽

Number Counts

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Combining cosmological constraints from cluster counts and galaxy clustering

Proceedings of the International Astronomical Union ◽

10.1017/s1743921314013556 ◽

2014 ◽

Vol 10 (S306) ◽

pp. 216-218 ◽

Cited By ~ 1

Author(s):

F. Lacasa

Keyword(s):

Large Scale ◽

Harmonic Space ◽

Cluster Number ◽

Dark Energy Survey ◽

Ongoing Work ◽

Cross Covariance ◽

Diagrammatic Method ◽

Non Gaussian ◽

Number Counts ◽

Halo Occupation Distribution

AbstractPresent and future large scale surveys offer promising probes of cosmology. For example the Dark Energy Survey (DES) is forecast to detect ~300 millions galaxies and thousands clusters up to redshift ~1.3. I here show ongoing work to combine two probes of large scale structure : cluster number counts and galaxy 2-point function (in real or harmonic space). The halo model (coupled to a Halo Occupation Distribution) can be used to model the cross-covariance between these probes, and I introduce a diagrammatic method to compute easily the different terms involved. Furthermore, I compute the joint non-Gaussian likelihood, using the Gram-Charlier series. Then I show how to extend the methods of Bayesian hyperparameters to Poissonian distributions, in a first step to include them in this joint likelihood.

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Number Counts of Clusters of Galaxies in X-ray and Submm Bands

Symposium - International Astronomical Union ◽

10.1017/s0074180900132723 ◽

1999 ◽

Vol 183 ◽

pp. 255-255 ◽

Cited By ~ 1

Author(s):

Tetsu Kitayama ◽

Shin Sasaki ◽

Yasushi Suto

Keyword(s):

Theoretical Models ◽

Model Parameters ◽

Clusters Of Galaxies ◽

Cluster Number ◽

Parameter Region ◽

X Ray ◽

Background Radiations ◽

The Press ◽

Number Counts ◽

Acceptable Parameter

We compute the number counts of clusters of galaxies, the logN-logS relation, in several X-ray and submm bands on the basis of the Press—Schechter theory (Kitayama et al. 1998). We pay particular attention to a set of theoretical models which well reproduce the ROSAT 0.5–2 keV band logN-logS (Ebeling et al. 1997; Rosati et al. 1997), and explore possibilities to further constrain the models from future observations with ASCA and/or at submm bands. The latter is closely related to the European PLANCK mission and the Japanese LMSA project. We exhibit that one can break the degeneracy in an acceptable parameter region on the Ω0–σ8 plane by combining the ROSAT logN-logS and the submm number counts. Models which reproduce the ROSAT band logN-logS will have N(> S) ∼ (150–300)(S/10−12 erg cm−2 s−) −1.3 str−1 at S ≳ 10−12 erg cm−2 s−1 in the ASCA 2–10 keV band, and N(> Sv) ∼ (102–104)(Sv/100 mJy)−1.5 str−1 at Sv ≳ 100m J y in the submm (0.85mm) band. The amplitude of the logN-logS is very sensitive to the model parameters in the submm band. We also compute the redshift evolution of the cluster number counts and compare with that of the X-ray brightest Abell-type clusters (Ebeling et al. 1996). The results, although still preliminary, point to low density (Ω0 ∼ 0.3) universes. The contribution of clusters to the X-ray and submm background radiations is shown to be insignificant in any model compatible with the ROSAT logN-logS.

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Confronting dark energy models using galaxy cluster number counts

Physical Review D ◽

10.1103/physrevd.82.083517 ◽

2010 ◽

Vol 82 (8) ◽

Cited By ~ 53

Author(s):

S. Basilakos ◽

M. Plionis ◽

J. A. S. Lima

Keyword(s):

Dark Energy ◽

Galaxy Cluster ◽

Cluster Number ◽

Energy Models ◽

Number Counts

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Understanding matched filters for precision cosmology

Monthly Notices of the Royal Astronomical Society ◽

10.1093/mnras/stab2461 ◽

2021 ◽

Vol 507 (4) ◽

pp. 4852-4863

Author(s):

Íñigo Zubeldia ◽

Aditya Rotti ◽

Jens Chluba ◽

Richard Battye

Keyword(s):

Noisy Data ◽

Approximate Expression ◽

Positive Bias ◽

Signal To Noise ◽

Cluster Number ◽

Matched Filters ◽

Unit Variance ◽

Non Gaussian ◽

Number Counts ◽

The Impact

Abstract Matched filters are routinely used in cosmology in order to detect galaxy clusters from mm observations through their thermal Sunyaev–Zeldovich (tSZ) signature. In addition, they naturally provide an observable, the detection signal-to-noise or significance, which can be used as a mass proxy in number counts analyses of tSZ-selected cluster samples. In this work, we show that this observable is, in general, non-Gaussian, and that it suffers from a positive bias, which we refer to as optimization bias. Both aspects arise from the fact that the signal-to-noise is constructed through an optimization operation on noisy data, and hold even if the cluster signal is modelled perfectly well, no foregrounds are present, and the noise is Gaussian. After reviewing the general mathematical formalism underlying matched filters, we study the statistics of the signal-to-noise with a set Monte Carlo mock observations, finding it to be well-described by a unit-variance Gaussian for signal-to-noise values of 6 and above, and quantify the magnitude of the optimization bias, for which we give an approximate expression that may be used in practice. We also consider the impact of the bias on the cluster number counts of Planck and the Simons Observatory (SO), finding it to be negligible for the former and potentially significant for the latter.

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