快速投影双谱:滤波方差法

Lea Harscouet, Jessica A. Cowell, Julia Ereza, David Alonso, Hugo Camacho, Andrina Nicola, Anze Slosar
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引用次数: 0

摘要

在大规模结构分析中对三阶统计量的研究一直受到以下因素的阻碍:双谱估计器(与幂谱相比)的复杂性增加、数据矢量的维度大以及估计其协方差矩阵的困难。在本文中,我们提出了滤波平方双谱(FSB),它是一种投影双谱估计器,有效地包含了在一定范围内滤波后的场平方与原始场之间的交叉相关性。在这一形式中,我们能够循环利用围绕功率谱测量建立的大部分基础设施,构建一个既快速又稳健的估计器,以抵御不完整天空观测造成的模式耦合效应。此外,我们还演示了现有的分析功率谱协方差估算技术可以在这一形式中使用,以非常高的精度计算双谱协方差,以一种与模型无关的方式自然地考虑最相关的高斯和非高斯贡献。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Fast Projected Bispectra: the filter-square approach
The study of third-order statistics in large-scale structure analyses has been hampered by the increased complexity of bispectrum estimators (compared to power spectra), the large dimensionality of the data vector, and the difficulty in estimating its covariance matrix. In this paper we present the filtered-squared bispectrum (FSB), an estimator of the projected bispectrum effectively consisting of the cross-correlation between the square of a field filtered on a range of scales and the original field. Within this formalism, we are able to recycle much of the infrastructure built around power spectrum measurement to construct an estimator that is both fast and robust against mode-coupling effects caused by incomplete sky observations. Furthermore, we demonstrate that the existing techniques for the estimation of analytical power spectrum covariances can be used within this formalism to calculate the bispectrum covariance at very high accuracy, naturally accounting for the most relevant Gaussian and non-Gaussian contributions in a model-independent manner.
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