Pseudo-likelihood Estimators for Graphical Models: Existence and Uniqueness

arXiv - MATH - Statistics Theory Pub Date : 2023-11-27 DOI:arxiv-2311.15528

Benjamin Roycraft, Bala Rajaratnam

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Abstract

Graphical and sparse (inverse) covariance models have found widespread use in modern sample-starved high dimensional applications. A part of their wide appeal stems from the significantly low sample sizes required for the existence of estimators, especially in comparison with the classical full covariance model. For undirected Gaussian graphical models, the minimum sample size required for the existence of maximum likelihood estimators had been an open question for almost half a century, and has been recently settled. The very same question for pseudo-likelihood estimators has remained unsolved ever since their introduction in the '70s. Pseudo-likelihood estimators have recently received renewed attention as they impose fewer restrictive assumptions and have better computational tractability, improved statistical performance, and appropriateness in modern high dimensional applications, thus renewing interest in this longstanding problem. In this paper, we undertake a comprehensive study of this open problem within the context of the two classes of pseudo-likelihood methods proposed in the literature. We provide a precise answer to this question for both pseudo-likelihood approaches and relate the corresponding solutions to their Gaussian counterpart.

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图模型的伪似然估计:存在性与唯一性

图形化和稀疏(逆)协方差模型在现代缺乏样本的高维应用中得到了广泛的应用。它们的广泛吸引力的一部分源于存在估计量所需的显著低样本量，特别是与经典的全协方差模型相比。对于无向高斯图形模型，最大似然估计存在所需的最小样本量是近半个世纪以来一个悬而未决的问题，最近才得到解决。伪似然估计器自70年代问世以来，同样的问题一直没有得到解决。伪似然估计最近受到了新的关注，因为它们施加了更少的限制性假设，具有更好的计算可追溯性，改进的统计性能，以及在现代高维应用中的适用性，从而重新引起了对这个长期存在的问题的兴趣。在本文中，我们在文献中提出的两类伪似然方法的背景下对这个开放问题进行了全面的研究。我们为这两种伪似然方法提供了这个问题的精确答案，并将相应的解与它们的高斯对应解联系起来。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - MATH - Statistics Theory

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