Brisk estimator for the angular multipoles of the redshift space bispectrum

Abstract

The anisotropy of the redshift space bispectrum depends upon the orientation of the triangles formed by three k modes with respect to the line of sight. For a triangle of fixed size (k1) and shape (μ,t), this orientation dependence can be quantified in terms of angular multipoles Bm(k1,μ,t) which contain a wealth of cosmological information. We propose a fast and efficient FFT-based estimator that computes the bispectrum multipole moments Bm of a 3D cosmological field for all possible and m (including m≠ 0). The time required by the estimator to compute all multipoles from a gridded data cube of volume Ng3 scales as O(Ng4) in contrast to the direct computation technique which requires time O(Ng6). Here, we demonstrate the formalism and validate the estimator using a simulated non-Gaussian field for which the analytical expressions for all the bispectrum multipoles are known. The estimated results are found to be in good agreement with the analytical predictions for all 16 non-zero multipoles (up to = 6, m=6). We expect the m ≠ 0 bispectrum multipoles to significantly enhance the information available from galaxy redshift surveys and future redshifted 21-cm observations.