Velocity Differences as a Probe of Non--Gaussian Density Fields

Abstract

We examine the multi--point velocity field for non--Gaussian models as a probe of non--Gaussian behavior. The two--point velocity correlation is not a useful indicator of a non--Gaussian density field, since it depends only on the power spectrum, even for non--Gaussian models. However, we show that the distribution of velocity differences 1 - 2, where 1 and 2 are measured at the points 1 and 2, respectively, is a good probe of non--Gaussian behavior, in that p(1 - 2) tends to be non--Gaussian whenever the density field is non--Gaussian. As an example, we examine the behavior of p(1 - 2) for non--Gaussian seed models, in which the density field is the convolution of a distribution of points with a set of density profiles. We apply these results to the global texture model.