The excursion set approach in non-Gaussian random fields

TL;DR

This paper extends the excursion set approach to non-Gaussian random fields, providing a simple, accurate approximation for first crossing distributions applicable to various cosmological models and non-Gaussian transformations.

Contribution

It introduces a formal series expansion for the first crossing distribution in non-Gaussian fields, showing that the leading order term remains accurate and simple to compute.

Findings

Leading order term approximates first crossing distribution well.

Extension to non-Gaussian fields via deterministic transformations is straightforward.

Results are applicable to late-time nonlinear fields and stochastic variables.

Abstract

Insight into a number of interesting questions in cosmology can be obtained from the first crossing distributions of physically motivated barriers by random walks with correlated steps. We write the first crossing distribution as a formal series, ordered by the number of times a walk upcrosses the barrier. Since the fraction of walks with many upcrossings is negligible if the walk has not taken many steps, the leading order term in this series is the most relevant for understanding the massive objects of most interest in cosmology. This first term only requires knowledge of the bivariate distribution of the walk height and slope, and provides an excellent approximation to the first crossing distribution for all barriers and smoothing filters of current interest. We show that this simplicity survives when extending the approach to the case of non-Gaussian random fields. For non-Gaussian fields which are obtained by deterministic transformations of a Gaussian, the first crossing distribution is simply related to that for Gaussian walks crossing a suitably rescaled barrier. Our analysis shows that this is a useful way to think of the generic case as well. Although our study is motivated by the possibility that the primordial fluctuation field was non-Gaussian, our results are general. In particular, they do not assume the non-Gaussianity is small, so they may be viewed as the solution to an excursion set analysis of the late-time, nonlinear fluctuation field rather than the initial one. They are also useful for models in which the barrier height is determined by quantities other than the initial density, since most other physically motivated variables (such as the shear) are usually stochastic and non-Gaussian. We use the Lognormal transformation to illustrate some of our arguments.