On the initial shear field of the cosmic web

TL;DR

This paper develops new analytic formulae for the initial shear field's eigenvalues in the cosmic web, incorporating constraints related to density maxima and minima, enhancing understanding of large-scale structure formation.

Contribution

It introduces constrained eigenvalue distributions for the initial shear field, accounting for the positivity or negativity of the displacement source, extending previous Doroshkevich's formulae.

Findings

Derived new conditional eigenvalue distributions for the initial shear field.

Connected the new formulae with existing literature on Gaussian statistics.

Outlined applications for structure formation and cosmic web analysis.

Abstract

The initial shear field, characterized by a primordial perturbation potential, plays a crucial role in the formation of large scale structures. Hence, considerable analytic work has been based on the joint distribution of its eigenvalues, associated with Gaussian statistics. In addition, directly related morphological quantities such as ellipticity or prolateness are essential tools in understanding the formation and structural properties of halos, voids, sheets and filaments, their relation with the local environment, and the geometrical and dynamical classification of the cosmic web. To date, most analytic work has been focused on Doroshkevich's unconditional formulae for the eigenvalues of the linear tidal field, which neglect the fact that halos (voids) may correspond to maxima (minima) of the density field. I present here new formulae for the constrained eigenvalues of the initial shear field associated with Gaussian statistics, which include the fact that those eigenvalues are related to regions where the source of the displacement is positive (negative): this is achieved by requiring the Hessian matrix of the displacement field to be positive (negative) definite. The new conditional formulae naturally reduce to Doroshkevich's unconditional relations, in the limit of no correlation between the potential and the density fields. As a direct application, I derive the individual conditional distributions of eigenvalues and point out the connection with previous literature. Finally, I outline other possible theoretically- or observationally-oriented uses, ranging from studies of halo and void triaxial formation, development of structure-finding algorithms for the morphology and topology of the cosmic web, till an accurate mapping of the gravitational potential environment of galaxies from current and future generation galaxy redshift surveys.