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Autori principali: Wang, William W., Jadbabaie, Ali
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2508.04897
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author Wang, William W.
Jadbabaie, Ali
author_facet Wang, William W.
Jadbabaie, Ali
contents It is commonly accepted that some phenomena are social: for example, individuals' smoking habits often correlate with those of their peers. Such correlations can have a variety of explanations, such as direct contagion or shared socioeconomic circumstances. The network linear-in-means model is a workhorse statistical model which incorporates these peer effects by including average neighborhood characteristics as regressors. Although the model's parameters are identifiable under mild structural conditions on the network, it remains unclear whether identification ensures reliable estimation in the "infill" asymptotic setting, where a single network grows in size. We show that when covariates are i.i.d. and the average network degree of nodes increases with the population size, standard estimators suffer from bias or slow convergence rates due to asymptotic collinearity induced by network averaging. As an alternative, we demonstrate that linear-in-sums models, which are based on aggregate rather than average neighborhood characteristics, do not exhibit such issues as long as the network degrees have some nontrivial variation, a condition satisfied by most network models.
format Preprint
id arxiv_https___arxiv_org_abs_2508_04897
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Weak Identification in Peer Effects Estimation
Wang, William W.
Jadbabaie, Ali
Statistics Theory
Social and Information Networks
Econometrics
It is commonly accepted that some phenomena are social: for example, individuals' smoking habits often correlate with those of their peers. Such correlations can have a variety of explanations, such as direct contagion or shared socioeconomic circumstances. The network linear-in-means model is a workhorse statistical model which incorporates these peer effects by including average neighborhood characteristics as regressors. Although the model's parameters are identifiable under mild structural conditions on the network, it remains unclear whether identification ensures reliable estimation in the "infill" asymptotic setting, where a single network grows in size. We show that when covariates are i.i.d. and the average network degree of nodes increases with the population size, standard estimators suffer from bias or slow convergence rates due to asymptotic collinearity induced by network averaging. As an alternative, we demonstrate that linear-in-sums models, which are based on aggregate rather than average neighborhood characteristics, do not exhibit such issues as long as the network degrees have some nontrivial variation, a condition satisfied by most network models.
title Weak Identification in Peer Effects Estimation
topic Statistics Theory
Social and Information Networks
Econometrics
url https://arxiv.org/abs/2508.04897