On the Distribution of Haloes, Galaxies and Mass

Abstract

The stochasticity in the distribution of dark haloes in the cosmic density field is reflected in the distribution function PV(Nh|δm) which gives the probability of finding Nh haloes in a volume V with mass density contrast δm. We study the properties of this function using high-resolution N-body simulations, and find that PV(Nn|δm) is significantly non-Poisson. The ratio between the variance and the mean goes from 1 (Poisson) at 1+δm 1 to <1 (sub-Poisson) at 1+δm 1 to >1 (super-Poisson) at 1+δm 1. The mean bias relation is found to be well described by halo bias models based on the Press-Schechter formalism. The sub-Poisson variance can be explained as a result of halo-exclusion while the super-Poisson variance at high δm may be explained as a result of halo clustering. A simple phenomenological model is proposed to describe the behavior of the variance as a function of δm. Galaxy distribution in the cosmic density field predicted by semi-analytic models of galaxy formation shows similar stochastic behavior. We discuss the implications of the stochasticity in halo bias to the modelling of higher-order moments of dark haloes and of galaxies.

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