BAYESIAN CLASSIFICATION, ANOMALY DETECTION, AND SURVIVAL ANALYSIS USING NETWORK INPUTS WITH APPLICATION TO THE
成果类型:
Article
署名作者:
Josephs, Nathaniel; Lin, Lizhen; Rosenberg, Steven; Kolaczyk, Eric D.
署名单位:
Yale University; University of Notre Dame; Boston University
刊物名称:
ANNALS OF APPLIED STATISTICS
ISSN/ISSBN:
1932-6157
DOI:
10.1214/22-AOAS1623
发表日期:
2023
页码:
199-224
关键词:
graph kernels
gaussian-processes
DYNAMICS
models
摘要:
While the study of a single network is well established, technological advances now allow for the collection of multiple networks with relative ease. Increasingly, anywhere from several to thousands of networks can be created from brain imaging, gene coexpression data, or microbiome measurements. And these networks, in turn, are being looked to as potentially powerful features to be used in modeling. However, with networks being non-Euclidean in nature, how best to incorporate them into standard modeling tasks is not obvious. In this paper we propose a Bayesian modeling framework that provides a unified approach to binary classification, anomaly detection, and survival analysis with network inputs. We encode the networks in the kernel of a Gaussian process prior via their pairwise differences, and we discuss several choices of provably positive definite kernel that can be plugged into our models. Although our methods are widely applicable, we are motivated here, in particular, by microbiome research (where network analysis is emerging as the standard approach for capturing the interconnectedness of microbial taxa across both time and space) and its potential for reducing preterm delivery and improving personalization of prenatal care.
来源URL: