Non‐parametric regression for networks

Severn, Katie E; Dryden, Ian L; Preston, Simon P

doi:10.1002/sta4.373

Non‐parametric regression for networks

Severn, Katie E; Dryden, Ian L; Preston, Simon P

Authors

KATIE SEVERN KATIE.SEVERN@NOTTINGHAM.AC.UK
Assistant Professor

IAN DRYDEN IAN.DRYDEN@NOTTINGHAM.AC.UK
Professor of Statistics

SIMON PRESTON simon.preston@nottingham.ac.uk
Professor of Statistics and Applied Mathematics

Abstract

Network data are becoming increasingly available, and so there is a need to develop suitable methodology for statistical analysis. Networks can be represented as graph Laplacian matrices, which are a type of manifold-valued data. Our main objective is to estimate a regression curve from a sample of graph Laplacian matrices conditional on a set of Euclidean covariates, for example in dynamic networks where the covariate is time. We develop an adapted Nadaraya-Watson estimator which has uniform weak consistency for estimation using Euclidean and power Euclidean metrics. We apply the methodology to the Enron email corpus to model smooth trends in monthly networks and highlight anomalous networks. Another motivating application is given in corpus linguistics, which explores trends in an author's writing style over time based on word co-occurrence networks.

Citation

Severn, K. E., Dryden, I. L., & Preston, S. P. (2021). Non‐parametric regression for networks. Stat, 10(1), Article e373. https://doi.org/10.1002/sta4.373

Journal Article Type	Article
Acceptance Date	Jan 20, 2021
Online Publication Date	Mar 1, 2021
Publication Date	2021-12
Deposit Date	Feb 4, 2021
Publicly Available Date	Mar 2, 2022
Journal	Stat
Electronic ISSN	2049-1573
Publisher	Wiley
Peer Reviewed	Peer Reviewed
Volume	10
Issue	1
Article Number	e373
DOI	https://doi.org/10.1002/sta4.373
Public URL	https://nottingham-repository.worktribe.com/output/5292341
Publisher URL	https://onlinelibrary.wiley.com/doi/abs/10.1002/sta4.373