二进制和计数网络数据的潜在收缩位置模型

IF 4.9 2区数学 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

Bayesian Analysis Pub Date : 2023-01-01 DOI:10.1214/23-ba1403

Xian Yao Gwee, Isobel Claire Gormley, Michael Fop

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引用次数: 1

摘要

参与者之间的交互通常使用网络来表示。潜在位置模型被广泛用于分析网络数据，它将每个参与者定位在一个潜在空间中。推断这个空间的尺寸是有挑战性的。通常，为了简单起见，使用两个维度或使用模型选择标准来选择维度，但这需要选择一个标准和拟合多个模型的计算费用。提出了潜在收缩位置模型(LSPM)，该模型从本质上推导了潜在空间的有效维数。LSPM采用贝叶斯非参数乘截断伽马过程，确保在更高维度上潜在位置的方差缩小。具有不可忽略方差的维度被认为对描述观察到的网络最有用，对潜在空间维度产生自动推理。虽然LSPM适用于许多网络类型，但本文分别针对二进制网络和计数网络开发了logistic和泊松LSPM。推理通过马尔可夫链蒙特卡罗算法进行，其中新颖的代理提议分布减少了计算负担。通过仿真研究评估了LSPM的性能，并通过实际网络数据集的应用说明了它的实用性。开源软件有助于更广泛地实现LSPM。

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A Latent Shrinkage Position Model for Binary and Count Network Data

Interactions between actors are frequently represented using a network. The latent position model is widely used for analysing network data, whereby each actor is positioned in a latent space. Inferring the dimension of this space is challenging. Often, for simplicity, two dimensions are used or model selection criteria are employed to select the dimension, but this requires choosing a criterion and the computational expense of fitting multiple models. Here the latent shrinkage position model (LSPM) is proposed which intrinsically infers the effective dimension of the latent space. The LSPM employs a Bayesian nonparametric multiplicative truncated gamma process prior that ensures shrinkage of the variance of the latent positions across higher dimensions. Dimensions with non-negligible variance are deemed most useful to describe the observed network, inducing automatic inference on the latent space dimension. While the LSPM is applicable to many network types, logistic and Poisson LSPMs are developed here for binary and count networks respectively. Inference proceeds via a Markov chain Monte Carlo algorithm, where novel surrogate proposal distributions reduce the computational burden. The LSPM’s properties are assessed through simulation studies, and its utility is illustrated through application to real network datasets. Open source software assists wider implementation of the LSPM.

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来源期刊

Bayesian Analysis 数学-数学跨学科应用

CiteScore

6.50

自引率

13.60%

发文量

审稿时长

>12 weeks

期刊介绍： Bayesian Analysis is an electronic journal of the International Society for Bayesian Analysis. It seeks to publish a wide range of articles that demonstrate or discuss Bayesian methods in some theoretical or applied context. The journal welcomes submissions involving presentation of new computational and statistical methods; critical reviews and discussions of existing approaches; historical perspectives; description of important scientific or policy application areas; case studies; and methods for experimental design, data collection, data sharing, or data mining. Evaluation of submissions is based on importance of content and effectiveness of communication. Discussion papers are typically chosen by the Editor in Chief, or suggested by an Editor, among the regular submissions. In addition, the Journal encourages individual authors to submit manuscripts for consideration as discussion papers.