The calculation of the characteristic function of the signal fluctuations due to clustered astrophysical sources is performed in this paper. For the typical case of power-law differential number counts and two-point angular correlation function, we present an extension of Zolotarev’s theorem that allows us to compute the cumulants of the logarithm of the absolute value of the intensity. As a test, simulations based on recent observations of radio galaxies are then carried out, showing that these cumulants can be very useful for determining the fundamental parameters defining the number counts and the correlation. If the angular correlation scale of the observed source population is known, the method presented here is able to obtain estimato...
Aims. We study the mean number counts and two-point correlation functions, along with their covarian...
Event-by-event long-range correlations of azimuthal anisotropy Fourier coefficients (v(n)) in 8.16 T...
The fully general calculation of the cosmic error on N-point correlation functions and related quant...
This work presents a set of new statistics, the cumulant correlators, aimed at high precision analys...
We develop an estimator for the correlation function which, in the ensemble average, returns the sha...
This thesis investigates two important subjects in cosmology: the 2-point functions of the galaxy nu...
Source confusion has been a long-standing problem in the astronomical history. In the previous formu...
We discuss the requirements of good statistics for quantifying non-Gaussianity in the Cosmic Microwa...
We show that if a sample of galaxy clusters is complete above some mass threshold, then hierarchical...
We present a fast computer code based on a simple algorithm for simulating realistic 2D distribution...
The angular two-point correlation function between background QSOs and foreground galaxies induced b...
Event-by-event long-range correlations of azimuthal anisotropy Fourier coefficients (v(n)) in 8.16 T...
International audienceEvent-by-event long-range correlations of azimuthal anisotropy Fourier coeffic...
The two-point correlation function of the galaxy distribution is a key cosmological observable that ...
Aims. We study the mean number counts and two-point correlation functions, along with their covarian...
Event-by-event long-range correlations of azimuthal anisotropy Fourier coefficients (v(n)) in 8.16 T...
The fully general calculation of the cosmic error on N-point correlation functions and related quant...
This work presents a set of new statistics, the cumulant correlators, aimed at high precision analys...
We develop an estimator for the correlation function which, in the ensemble average, returns the sha...
This thesis investigates two important subjects in cosmology: the 2-point functions of the galaxy nu...
Source confusion has been a long-standing problem in the astronomical history. In the previous formu...
We discuss the requirements of good statistics for quantifying non-Gaussianity in the Cosmic Microwa...
We show that if a sample of galaxy clusters is complete above some mass threshold, then hierarchical...
We present a fast computer code based on a simple algorithm for simulating realistic 2D distribution...
The angular two-point correlation function between background QSOs and foreground galaxies induced b...
Event-by-event long-range correlations of azimuthal anisotropy Fourier coefficients (v(n)) in 8.16 T...
International audienceEvent-by-event long-range correlations of azimuthal anisotropy Fourier coeffic...
The two-point correlation function of the galaxy distribution is a key cosmological observable that ...
Aims. We study the mean number counts and two-point correlation functions, along with their covarian...
Event-by-event long-range correlations of azimuthal anisotropy Fourier coefficients (v(n)) in 8.16 T...
The fully general calculation of the cosmic error on N-point correlation functions and related quant...