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Bibliographic Details
Main Author: Davies, Annabel L
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2505.18036
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author Davies, Annabel L
author_facet Davies, Annabel L
contents Network meta-analysis (NMA) combines evidence from multiple trials comparing treatment options for the same condition. The method derives its name from a graphical representation of the data where nodes are treatments, and edges represent comparisons between treatments in trials. However, edges in this graph are limited to pairwise comparisons and fail to represent trials that compare more than two treatments. In this paper, we describe NMA as a bipartite graph where trials define a second type of node. Edges then correspond to the arms of trials, connecting each trial node to the treatment nodes it compares. We consider an NMA model parameterized in terms of the observations in each arm. By linking the hat matrix of this model to the bipartite framework, we reveal how evidence flows through the arms of trials. We then define a random walk on the bipartite graph and propose two conjectures that relate the movement of this walker to evidence flow. We illustrate our methods on a network of treatments for plaque psoriasis and verify our conjectures in simulations on randomly generated graphs. The bipartite framework provides new insights into the evidence structure of NMA and the role of individual trials in producing NMA estimates.
format Preprint
id arxiv_https___arxiv_org_abs_2505_18036
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle The bipartite structure of treatment-trial networks reveals the flow of information in network meta-analysis
Davies, Annabel L
Methodology
Network meta-analysis (NMA) combines evidence from multiple trials comparing treatment options for the same condition. The method derives its name from a graphical representation of the data where nodes are treatments, and edges represent comparisons between treatments in trials. However, edges in this graph are limited to pairwise comparisons and fail to represent trials that compare more than two treatments. In this paper, we describe NMA as a bipartite graph where trials define a second type of node. Edges then correspond to the arms of trials, connecting each trial node to the treatment nodes it compares. We consider an NMA model parameterized in terms of the observations in each arm. By linking the hat matrix of this model to the bipartite framework, we reveal how evidence flows through the arms of trials. We then define a random walk on the bipartite graph and propose two conjectures that relate the movement of this walker to evidence flow. We illustrate our methods on a network of treatments for plaque psoriasis and verify our conjectures in simulations on randomly generated graphs. The bipartite framework provides new insights into the evidence structure of NMA and the role of individual trials in producing NMA estimates.
title The bipartite structure of treatment-trial networks reveals the flow of information in network meta-analysis
topic Methodology
url https://arxiv.org/abs/2505.18036