阈值化图形套索调整潜在变量

Thresholded graphical lasso adjusts for latent variables

Biometrika · 2022
被引 7
ABS 4

中文导读

提出对现有图选择方法施加硬阈值算子的简单方案,在潜在变量存在时实现图选择一致性,统计速率更优,并在神经科学案例中估计功能神经连接。

Abstract

Summary Structural learning of Gaussian graphical models in the presence of latent variables has long been a challenging problem. Chandrasekaran et al. (2012) proposed a convex program for estimating a sparse graph plus a low-rank term that adjusts for latent variables; however, this approach poses challenges from both computational and statistical perspectives. We propose an alternative, simple solution: apply a hard-thresholding operator to existing graph selection methods. Conceptually simple and computationally attractive, the approach of thresholding the graphical lasso is shown to be graph selection consistent in the presence of latent variables under a simpler minimum edge strength condition and at an improved statistical rate. The results are extended to estimators for thresholded neighbourhood selection and constrained $\ell_{1}$-minimization for inverse matrix estimation as well. We show that our simple thresholded graph estimators yield stronger empirical results than existing methods for the latent variable graphical model problem, and we apply them to a neuroscience case study on estimating functional neural connections.

高斯图模型潜在变量图选择高维统计神经科学