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Auteurs principaux: Su, Wenqing, Guo, Xiao, Yang, Ying
Format: Preprint
Publié: 2024
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Accès en ligne:https://arxiv.org/abs/2406.11152
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author Su, Wenqing
Guo, Xiao
Yang, Ying
author_facet Su, Wenqing
Guo, Xiao
Yang, Ying
contents Multi-layer networks arise naturally in various domains including biology, finance and sociology, among others. The multi-layer stochastic block model (multi-layer SBM) is commonly used for community detection in the multi-layer networks. Most of current literature focuses on statistical consistency of community detection methods under multi-layer SBMs. However, the asymptotic distributional properties are also indispensable which play an important role in statistical inference. In this work, we aim to study the estimation and asymptotic properties of the layer-wise scaled connectivity matrices in the multi-layer SBMs. We develop a novel and efficient method to estimate the scaled connectivity matrices. Under the multi-layer SBM and its variant multi-layer degree-corrected SBM, we establish the asymptotic normality of the estimated matrices under mild conditions, which can be used for interval estimation and hypothesis testing. Simulations show the superior performance of proposed method over existing methods in two considered statistical inference tasks. We also apply the method to a real dataset and obtain interpretable results.
format Preprint
id arxiv_https___arxiv_org_abs_2406_11152
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Limit Results for Estimation of Connectivity Matrix in Multi-layer Stochastic Block Models
Su, Wenqing
Guo, Xiao
Yang, Ying
Statistics Theory
Multi-layer networks arise naturally in various domains including biology, finance and sociology, among others. The multi-layer stochastic block model (multi-layer SBM) is commonly used for community detection in the multi-layer networks. Most of current literature focuses on statistical consistency of community detection methods under multi-layer SBMs. However, the asymptotic distributional properties are also indispensable which play an important role in statistical inference. In this work, we aim to study the estimation and asymptotic properties of the layer-wise scaled connectivity matrices in the multi-layer SBMs. We develop a novel and efficient method to estimate the scaled connectivity matrices. Under the multi-layer SBM and its variant multi-layer degree-corrected SBM, we establish the asymptotic normality of the estimated matrices under mild conditions, which can be used for interval estimation and hypothesis testing. Simulations show the superior performance of proposed method over existing methods in two considered statistical inference tasks. We also apply the method to a real dataset and obtain interpretable results.
title Limit Results for Estimation of Connectivity Matrix in Multi-layer Stochastic Block Models
topic Statistics Theory
url https://arxiv.org/abs/2406.11152