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Automated detection of edge clusters via an overfitted mixture prior

Published online by Cambridge University Press:  19 January 2024

Hanh T. D. Pham*
Affiliation:
University of Iowa, Iowa City, IA, USA
Daniel K. Sewell
Affiliation:
University of Iowa, Iowa City, IA, USA
*
Corresponding author: Hanh T. D. Pham; Email: hanh-pham@uiowa.edu
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Abstract

Most community detection methods focus on clustering actors with common features in a network. However, clustering edges offers a more intuitive way to understand the network structure in many real-life applications. Among the existing methods for network edge clustering, the majority are algorithmic, with the exception of the latent space edge clustering (LSEC) model proposed by Sewell (Journal of Computational and Graphical Statistics, 30(2), 390–405, 2021). LSEC was shown to have good performance in simulation and real-life data analysis, but fitting this model requires prior knowledge of the number of clusters and latent dimensions, which are often unknown to researchers. Within a Bayesian framework, we propose an extension to the LSEC model using a sparse finite mixture prior that supports automated selection of the number of clusters. We refer to our proposed approach as the automated LSEC or aLSEC. We develop a variational Bayes generalized expectation-maximization approach and a Hamiltonian Monte Carlo-within Gibbs algorithm for estimation. Our simulation study showed that aLSEC reduced run time by 10 to over 100 times compared to LSEC. Like LSEC, aLSEC maintains a computational cost that grows linearly with the number of actors in a network, making it scalable to large sparse networks. We developed the R package aLSEC which implements the proposed methodology.

Type
Research Article
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Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution and reproduction, provided the original article is properly cited.
Copyright
© The Author(s), 2024. Published by Cambridge University Press

1. Introduction

A network consists of actors whose relationships are represented as edges connecting them. By analyzing the connections between actors and the overall structure of the network, researchers can gain valuable insights into the phenomenon from which the network arises. Examples of network applications exist in epidemiology (e.g., studying the spread of infectious disease, Salathé et al., Reference Salathé, Kazandjieva, Lee, Levis, Feldman and Jones2010), social science (e.g., exploring the relationship between social media use and opinion polarization, Lee et al., Reference Lee, Choi, Kim and Kim2014, biology e.g., identifying functionally coordinated interactions between proteins, Pereira-Leal et al., Reference Pereira-Leal, Enright and Ouzounis2004), and many other fields. A widely studied topic in network analysis is community detection, which generally involves partitioning actors into groups such that actors are densely connected within their groups but sparsely connected with others (Harenberg et al., Reference Harenberg, Bello, Gjeltema, Ranshous, Harlalka, Seay and Samatova2014). Among the vast amount of methods dedicated to clustering network actors in literature, many employed a model-based approach. Compared to algorithmic approaches, model-based community detection offers researchers advantages such as the capacity to quantify the uncertainty of estimates, infer missing data, and make predictions. Some notable model-based approaches for static networks are the latent position cluster model (Handcock et al., Reference Handcock, Raftery and Tantrum2007), stochastic block model (SBM) (Nowicki & Snijders, Reference Nowicki and Snijders2001), degree-corrected SBM (Karrer & Newman, Reference Karrer and Newman2011), and mixed-membership SBM (Airoldi et al., Reference Airoldi, Blei, Fienberg, Xing, Koller, Schuurmans, Bengio and Bottou2008). Relevant methods for dynamic networks include the stochastic block transition model (Xu, Reference Xu, Lebanon and Vishwanathan2015), and the latent space approach to community detection built upon distance and projection models (Sewell & Chen, Reference Sewell and Chen2017).

While most community detection methods focus on clustering actors based on their connections, there are situations where clustering the edges provides a more intuitive way to characterize the network structure. For example, actors create friendships within a specific context in social networks, such as a classroom or workplace. An edge-centric approach to community detection can shed light on the context and facilitate knowledge about systems of flows in a network (Sewell, Reference Sewell2021). Despite the advantages of intuition and interpretation, few methods have been developed to cluster a network’s edges. Most have been algorithmic in nature, using reasonable yet ad hoc approaches (Pereira-Leal et al., Reference Pereira-Leal, Enright and Ouzounis2004; Evans & Lambiotte, Reference Evans and Lambiotte2009; Wu et al., Reference Wu, Lin, Wan and Tian2010; Ahn et al., Reference Ahn, Bagrow and Lehmann2010). An exception to this, and the approach we focus on in this paper, is the latent space edge clustering (LSEC) method proposed by Sewell (Reference Sewell2021). This model-based approach aims at finding the unobserved contexts in which edges form. In the LSEC model, the edges represent units of observation and are determined stochastically based on latent actor-level features and the latent environment of the edge contexts. This is in contrast to actor-centric methods where dyads are treated as the units of observations. That is, actor-centric approaches model the probability that actors $i$ and $j$ are connected (the edge is the random binary variable), whereas edge-centric approaches model the probability that an edge connects actors $i$ and $j$ (the incident actors are the random polychotomous variables) (Sewell, Reference Sewell2021).

Despite the promising results in simulation studies and real-world data analyses, the method has limitations. A challenge in fitting LSEC models is the double model selection problem, where the number of latent dimensions $p$ and the number of clusters $K$ must be specified beforehand. Sewell (Reference Sewell2021) proposed fitting various models assuming different combinations of possible values of $p$ and $K$ before using the Akaike Information Criterion (AIC) and the Integrated Completed Likelihood (ICL) criterion, respectively, to select the optimal model. However, this approach ignores the uncertainty associated with estimating $p$ and $K$ and can be computationally costly to implement when considering multiple possible values of $p$ and $K$ . Under a Bayesian framework, we propose an adjustment for the priors in the LSEC model to simultaneously obtain estimates for both the number of clusters $K$ and cluster-specific parameters. Even though we assume a known value of $p$ , our simulation study showed that the penalty for incorrectly specifying $p$ in our algorithm was minimal in most cases and eliminated the need to pick the correct value of $p$ .

Several methods have been proposed in actor-centric community detection literature to tackle the challenge of selecting the number of clusters. Within a Bayesian framework, it is possible to select a prior for the number of components in the finite mixture model and then estimate it using a reversible jump Markov chain Monte Carlo (RJMCMC) sampler (Green, Reference Green1995). RJMCMC suffers from low acceptance rates, making it challenging to implement efficiently in practice (Stephens, Reference Stephens2000; Green & Hastie, Reference Green and Hastie2009). An alternative is to use a Bayesian non-parametric model such as the Dirichlet Process Mixture Model (DPMM). However, Miller & Harrison (Reference Miller, Harrison, Burges, Bottou, Welling, Ghahramani and Weinberger2013) offered some evidence showing that the posterior of the number of clusters in DPMM was not consistent. Other approaches to estimating the number of clusters include modularity maximization (Newman, Reference Newman2006), efficient inference algorithms for mixture of finite mixture models with a prior on the number of components (Miller & Harrison, Reference Miller and Harrison2018; Geng et al., Reference Geng, Bhattacharya and Pati2019), maximization of the posterior probability of the number of clusters given the network (Newman & Reinert, Reference Newman and Reinert2016), evaluation of eigenvalues of matrices associated with the network (Le & Levina, Reference Le and Levina2015), and hypothesis testing (Lo et al., Reference Lo, Mendell and Rubin2001).

Unlike clustering the actors of a network, to the authors’ knowledge there have been no prior attempts to automatically determine the number of clusters when clustering the edges of a network. This paper applies a sparse finite mixture approach to the LSEC model to simultaneously obtain estimates of the number of clusters and other model variables of interest. We derive a computationally efficient variational Bayes generalized EM algorithm and a gradient-based Monte Carlo algorithm for estimation. We show in a simulation study that good estimation performance is obtained so long as the latent space’s dimension is overspecified. By avoiding the need for a large number of repeated model fitting for various values of $p$ and $K$ as is necessary using the current state-of-the-art method, we reduced the computation time by 10–100 times in our analyses. Our generalized EM algorithm is efficient with a computational cost that grows linearly with the number of actors and edges in a network. The R package and code for analyzing the UK faculty network example in Section 4 can be found online.Footnote 1

The remainder of this paper is as follows. Section 2 describes our method and estimation algorithm. Section 3 shows the results of our simulation study. Section 4 provides two examples of applying our method to real network data sets. Finally, Section 5 wraps up the paper with a discussion on the strengths and limitations of our approach.

2. Methods

2.1 Latent space edge clustering model

The latent space edge clustering model is formulated based on the idea that edges connect actors who share some characteristics with the same environment where the edges are formed (Sewell, Reference Sewell2021). Sewell explained two scenarios where this phenomenon emerges: relationship forming and opportunities for diffusion. In the former, the edges are formed between actors who engage in a joint latent group or environment, thus representing the various latent contexts of network connections. In the latter, the edges create systems of flows, where each system consists of edges that tend to act cohesively in a diffusion process.

Given a network with $n$ actors and $M$ edges, denote each edge $\boldsymbol{{e}}_m = (e_{m1}, e_{m2})$ . We assume that the network is unweighted and directed, but the model can also be adapted to undirected networks. Let $K$ be the number of edge classes and $p$ be the number of latent dimensions. Let $\boldsymbol{{Z}}_{M\times K}$ be a latent class assignment matrix such that $Z_{mk}$ equals one if the mth edge belongs to class $k$ and zero otherwise. Let $\boldsymbol{{W}}_{K \times p}$ be a matrix such that each row $\boldsymbol{{W}}_{k}$ corresponds to the latent features of edge class $k$ . Let $\boldsymbol{{U}}_{n \times p}, \boldsymbol{{V}}_{n \times p}$ be matrices where their respective rows $\boldsymbol{{U}}_i$ and $\boldsymbol{{V}}_i$ denote the latent sending and receiving features of actor $i$ . Lastly, let $\boldsymbol{{S}} = (S_1,\ldots, S_n)$ and $\boldsymbol{{R}} = (R_1,\ldots, R_n)$ represent actors’ specific overall propensities to send and receive edges respectively. The LSEC model proposed by Sewell (Reference Sewell2021) is given as

\begin{align*} f(\mathcal{E}| \boldsymbol{{Z}}) &= \prod _{m = 1}^M \prod _{k = 1}^K \left [f(\boldsymbol{{e}}_{m}|Z_{mk} = 1)\right ]^{Z_{mk}} & \\[5pt] &= \prod _{m = 1}^M \prod _{k = 1}^K [f(e_{m1}|Z_{mk} = 1) f(e_{m2}|e_{m1}, Z_{mk} = 1)]^{Z_{mk}}, \end{align*}

where

(1) \begin{align} f(e_{m1} = i|Z_{mk} = 1) & = \frac{e^{S_i + \boldsymbol{{U}}_i\boldsymbol{{W}}^\prime _k}}{g_{uk}}, & \nonumber \\[5pt] f(e_{m2} = j|e_{m1} = i, Z_{mk} = 1) & = \begin{cases} \frac{e^{R_j + \boldsymbol{{V}}_j\boldsymbol{{W}}^\prime _k}}{g_{vk} - e^{R_i + \boldsymbol{{V}}_i\boldsymbol{{W}}^\prime _k}} \text{ if } i \neq j \nonumber \\[12pt] 0 \text{ otherwise,} \end{cases} & \nonumber \\[5pt] g_{uk} & = \sum _{i = 1}^n e^{S_i + \boldsymbol{{U}}_i\boldsymbol{{W}}^\prime _k}, & \nonumber \\[5pt] g_{vk} & = \sum _{j = 1}^n e^{R_j + \boldsymbol{{V}}_j\boldsymbol{{W}}^\prime _k}. \end{align}

The model is always conditioning on $(\boldsymbol{{S}}, \boldsymbol{{R}}, \boldsymbol{{U}}, \boldsymbol{{V}}, \boldsymbol{{W}})$ , which are omitted here for lack of space. Conditioning on the latent features of the actors and latent edge classes, the edges are independent. The conditional distribution of the probability of an edge $m$ connecting actors $i$ and $j$ is a product of two multinomial distributions, where $g_{uk}$ and $g_{vk}$ are the normalizing constants. The first multinomial distribution corresponds to the probability of choosing the origin of a directed edge among the $n$ actors. Conditioning on the choice of the origin, the second distribution corresponds to the probability of selecting the destination of the directed edge among the remaining $n-1$ actors. The formulation of the LSEC model implies that an edge in a specific environment will be more likely to be incident on certain actors. Those actors not only have high general propensity to send/receive edges, which is captured via $(\boldsymbol{{S}},\boldsymbol{{R}})$ , but also share some features with the edge’s environment. The dot product between the actors’ latent features $(\boldsymbol{{U}}, \boldsymbol{{V}})$ and the edges’ latent features $(\boldsymbol{{W}})$ reflects the latter phenomenon.

We adopt a Bayesian approach to estimation, using the same priors as suggested in Sewell (Reference Sewell2021) for $\{\boldsymbol{{U}}, \boldsymbol{{V}}, \boldsymbol{{S}}, \boldsymbol{{R}}, \boldsymbol{{W}}, \tau _U, \tau _V, \tau _S, \tau _R\}$ , which are given by

(2) \begin{align} \nonumber \boldsymbol{{U}}_i & \overset{\text{iid}}{\sim } N(\mathbf{0},\tau _{U}^{-1} \mathcal{I}_p), & & \tau _U \sim \Gamma (a_U/2, b_U/2), \\[5pt] \nonumber \boldsymbol{{V}}_i & \overset{\text{iid}}{\sim } N(\mathbf{0},\tau _{V}^{-1} \mathcal{I}_p), & & \tau _V \sim \Gamma (a_V/2, b_V/2), \\[5pt] \nonumber S_i & \overset{\text{iid}}{\sim } N(0, \tau _S^{-1}), & & \tau _S \sim \Gamma (a_S/2, b_S/2), \\[5pt] \nonumber R_i & \overset{\text{iid}}{\sim } N(0, \tau _R^{-1}), & & \tau _R \sim \Gamma (a_R/2, b_R/2), \\[5pt] \boldsymbol{{W}}_{k} & \overset{\text{iid}}{\sim } N(\mathbf{0}, \mathcal{I}_p), & & \end{align}

where $N(\boldsymbol{{a}}, \boldsymbol{{B}})$ is a multivariate normal distribution with mean vector $\boldsymbol{{a}}$ and covariance matrix $\boldsymbol{{B}}$ , $\Gamma (a, b)$ is a gamma distribution with shape $a$ and rate $b$ , and $\mathcal{I}_p$ is a $p$ -dimensional identity matrix. The identity matrix is used as the covariance of $\boldsymbol{{W}}_k$ ’s to avoid non-identifiability due to the dot products with $\boldsymbol{{U}}_i$ ’s and $\boldsymbol{{V}}_i$ ’s in the model likelihood. The relationship between parameters in the LSEC model is illustrated through a directed acyclic graph in Figure 1, along with the prior on $\boldsymbol{{Z}}$ for our proposed approach which will be described in the following section.

Figure 1. Relationship between parameters in the LSEC model (circles) and parameters in the proposed extension (rectangles).

Since the number of components $K$ and number of latent dimensions $p$ are unknown, Sewell recommended fitting a model for each combination of plausible $\{K, p\}$ and choosing the best model according to some information criteria. However, obtaining estimation for each candidate model is challenging and time-consuming, given that the parameter space is high dimensional ( $2n+2np+Kp+4;$ in addition to the dimension of $\boldsymbol{{Z}}$ and its prior’s hyperparameters). In what follows, we propose a different strategy that would fit the model only once in order to drastically save time and resources.

2.2 Sparse finite mixture models

Finite mixture models provide a flexible and computationally convenient framework to describe many complex distributions and perform clustering (McLachlan et al., Reference McLachlan, Lee and Rathnayake2019). To overcome the problem of choosing the appropriate number of components of a mixture distribution, researchers can use an overfitted model where the number of components exceeds what is supported by the data (Rousseau & Mengersen, Reference Rousseau and Mengersen2011). Based on the theoretical results of overfitted mixture models derived by Rousseau & Mengersen (Reference Rousseau and Mengersen2011), Malsiner-Walli et al. (Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2016) formulated the concept of the sparse finite mixture model (SFMM) under the Bayesian framework of model-based clustering. SFMMs share many similar properties with other Bayesian non-parametric mixture models that assume an infinite number of components, including automatic detection of the number of clusters (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2017). However, SFMMs operate within the framework of finite mixtures and, therefore, come with a straightforward estimation strategy (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2016). While SFMMs were initially developed assuming Gaussian mixtures, Frühwirth-Schnatter & Malsiner-Walli (Reference Frühwirth-Schnatter and Malsiner-Walli2019) further demonstrated how the method could be adapted to other applications of non-Gaussian mixtures, such as Poisson mixtures, latent class analysis, and mixtures of skew-normal distributions.

Assuming the data is generated from a finite mixture model, observations corresponding to the same component form a cluster. The key idea behind SFMM is to deliberately overfit the mixture models so that there are components that do not associate with any observation (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2016). As a result, the total number of mixture components $K$ is greater than the true number of clusters in the data $K_{\text{true}}$ . While $K$ is fixed, $K_{\text{true}}$ is a random variable and can take on values smaller than $K$ with a high probability granted an appropriate choice of prior (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2016, Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2017; Frühwirth-Schnatter & Malsiner-Walli, Reference Frühwirth-Schnatter and Malsiner-Walli2019). Given a prior on $\alpha$ that puts a large probability mass on small values near zero, the Dirichlet prior of $\pi$ will show a strong preference for zero weights, resulting in empty clusters among the $K$ components of the mixture models a priori (Frühwirth-Schnatter & Malsiner-Walli, Reference Frühwirth-Schnatter and Malsiner-Walli2019).

Inspired by the sparse finite mixture model approach, we assume the priors for $\boldsymbol{{Z}}$ to evaluate cluster assignment of the edges (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2016, Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2017; Frühwirth-Schnatter & Malsiner-Walli, Reference Frühwirth-Schnatter and Malsiner-Walli2019) to be

(3) \begin{align} \boldsymbol{{Z}}_m | \boldsymbol{\pi } & \overset{\text{iid}}{\sim } \text{Multinom}(1, \boldsymbol{\pi }) \nonumber \\[5pt] \boldsymbol{\pi } & \sim \text{Dirichlet}(\alpha \textbf{1}_K) \nonumber \\[5pt] \alpha & \sim \Gamma (a_a, b_a), \end{align}

where $\text{Multinorm}(1, \boldsymbol{{a}})$ is a multinomial distribution with 1 trial and event probabilities $\boldsymbol{{a}}$ , $\text{Dirichlet}(\boldsymbol{{a}})$ is a Dirichlet distribution with concentration $\boldsymbol{{a}}$ , $\textbf{1}_K$ is a $K$ -dimensional vector of 1’s, and $K$ is set intentionally large as an upper bound on the number of true clusters. In our model, the multinomial prior on the cluster label $\boldsymbol{{Z}}$ implies that the marginal likelihood of the edges follows a mixture distribution with weight $\boldsymbol{\pi }$ .

(4) \begin{align} f(\mathcal{E}_i) = \sum _{k=1}^K \pi _k \frac{\exp \{S_{\boldsymbol{{e}}_{m1}} + R_{\boldsymbol{{e}}_{m2}} + (\boldsymbol{{U}}_{\boldsymbol{{e}}_{m1}} + \boldsymbol{{V}}_{\boldsymbol{{e}}_{m2}}) \boldsymbol{{W}}^\prime _k \}}{f_{uk} (f_{vk} - \exp \{R_{\boldsymbol{{e}}_{m1}} + \boldsymbol{{V}}_{\boldsymbol{{e}}_{m1}} \boldsymbol{{W}}^\prime _k\})} \end{align}

The SFMM is closely related to the DPMM. When the hyperparameter $\alpha$ is set to $\alpha _0/K$ and K goes to infinity, the SFMM converges to a DPMM with mixing distribution $DP(\alpha _0, H)$ , where $H$ is the base measure from which $\boldsymbol{{W}}_k$ are drawn iid (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2016). While the a priori expected number of clusters $K_{\text{true}}$ is solely determined by the concentration parameter in the DPMM, it is also impacted by the number of mixture components $K$ in the SFMM (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2017). One may seek to draw a connection between SFMM and other two-parameter Bayesian non-parametric mixture models, such as the Pitman-Yor Process Mixture Model (PYPMM) (Pitman & Yor, Reference Pitman and Yor1997). Malsiner-Walli et al. (Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2017) provided a detailed comparison of SFMM against both the DPMM and PYPMM. In SFMM, the prior probability of creating new clusters decreases with the increasing number of non-empty clusters, whereas it remains constant in the DPMM and increases in PYPMM (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2017). Additionally, as the sample size increases, the a priori expected number of clusters $K_{\text{true}}$ increases in Baysian non-parametric mixture models including the DPMM and PYPMM, but this value remains constant in SFMM (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2017).

Researchers have studied the impact of the hyperparameter $\alpha$ values on the number of clusters in overfitted mixtures models. Using a fixed value of $\alpha$ instead of the Gamma hyperprior, Rousseau & Mengersen (Reference Rousseau and Mengersen2011) presented some theoretical justification for the upper bounds of $\alpha$ that is necessary to empty superfluous clusters. In particular, if $\alpha \lt d/2$ , where $d$ is the dimension of the component-specific parameter space, then the posterior expectation of the weights of superfluous clusters converges to zero as the sample size goes to infinity. Otherwise, there will exist at least two identical components with non-negligible weights, leading to overestimating the number of clusters due to these duplicated components (Rousseau & Mengersen, Reference Rousseau and Mengersen2011). In practice, when we have a finite number of observations, it is necessary to select much smaller values for $\alpha$ than the proposed upper bound $d/2$ (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2016). We opted for using a Gamma hyperprior on $\alpha$ instead of fixing $\alpha$ at a small value based on evidence from Frühwirth-Schnatter & Malsiner-Walli (Reference Frühwirth-Schnatter and Malsiner-Walli2019). In our analyses, we used their recommended hyperprior $\Gamma (1, 200)$ and truncation level $K=10$ because Frühwirth-Schnatter & Malsiner-Walli showed that these specifications had good quality in emptying superfluous clusters in both the simulation study and real data analysis.

2.3 Estimation via variational Bayes generalized EM algorithm

We adopt a generalized expectation-maximization (GEM) approach to estimation, where the E step involves evaluating the conditional expectation of $(\boldsymbol{{Z}},\boldsymbol{\pi }) | \mathcal{E}$ and the M step entails performing conjugate gradient updates to maximize $Q$ with respect to $\boldsymbol{\theta } \;:\!=\; \{\boldsymbol{{S}}, \boldsymbol{{R}}, \boldsymbol{{U}}, \boldsymbol{{V}}, \boldsymbol{{W}}, \tau _S, \tau _R, \tau _U, \tau _V, \alpha \}$ . In most GEM applications in the finite mixture models, $\boldsymbol{{Z}}$ is assumed to be the latent variable in the E step. Other variables, including the mixture weights, are chosen to maximize the expected log posterior in the M step. With this setup, the E step is tractable. However, in the case of the overfitted or sparse mixture models, the posterior modes of the mixture weights do not exist due to the anticipated empty components. An alternative option is to integrate out the weights, yet this renders the E step intractable. The expectation of $\boldsymbol{{Z}}$ , as a result, requires approximation via either MCMC or variational Bayes (VB) method. VB is generally fast, but it can still impose a hefty computational cost in the absence of analytical solutions, which is, unfortunately, the case here. Instead, we consider both $\boldsymbol{{Z}}$ and $\boldsymbol{\pi }$ as the latent variables in the E step and use the following variational approximation of the conditional posterior:

(5) \begin{align} f(\boldsymbol{{Z}},\boldsymbol{\pi }| \mathcal{E}, \tilde{\boldsymbol{\theta }}) \approx q(\boldsymbol{{Z}}) q(\boldsymbol{\pi }) = \left (\prod _{m = 1}^M q(\boldsymbol{{Z}}_m)\right ) q(\boldsymbol{\pi }). \end{align}

The variational distributions are selected by minimizing the Kullback-Leibler divergence between $q(\boldsymbol{{Z}}) q(\boldsymbol{\pi })$ and $f(\boldsymbol{{Z}},\boldsymbol{\pi }| \mathcal{E}, \tilde{\boldsymbol{\theta }})$ , which is the same as maximizing the evidence lower bound (ELBO) of the log marginal likelihood defined as

(6) \begin{align} \text{ELBO} \;:\!=\; E_{q\left (\boldsymbol{{Z}}, \boldsymbol{\pi }\right )} \left ( \log f(\boldsymbol{\theta }, \boldsymbol{{Z}}, \boldsymbol{\pi }|\mathcal{E}) \right ) - E_{q\left (\boldsymbol{{Z}}, \boldsymbol{\pi }\right )} \left ( \log q(\boldsymbol{{Z}}, \boldsymbol{\pi }) \right ). \end{align}

Performing coordinate ascent to maximize the ELBO yields the following solutions, where $\boldsymbol{{Z}}_{-m}$ is the set of $\boldsymbol{{Z}}$ ’s that does not include $\boldsymbol{{Z}}_m$ (Wang & Blei, Reference Wang and Blei2013; Beal, Reference Beal2003).

(7) \begin{align} q(\boldsymbol{{Z}}_m) & \propto e^{E_{\boldsymbol{\pi }}(\log \pi (\boldsymbol{{Z}}_m, \mathcal{E}|\boldsymbol{\pi }, \boldsymbol{{Z}}_{-m} \tilde{\boldsymbol{\theta }} ))} \nonumber \\[5pt] q(\boldsymbol{\pi }) & \propto e^{E_{\boldsymbol{{Z}}}(\log \pi (\boldsymbol{\pi }, \mathcal{E}| \boldsymbol{{Z}}, \tilde{\boldsymbol{\theta }} )} \end{align}

We then iterate between conditioning on either $\boldsymbol{{Z}}$ or $\boldsymbol{\pi }$ and updating the other until convergence. Given the multinomial-Dirichlet priors, the updates have analytical forms. In particular, the variational distribution $q(\boldsymbol{{Z}}_m)$ is a multinomial distribution with weights $\tilde{p}_{mk}$ and $q(\boldsymbol{\pi })$ is a Dirichlet distribution with concentration parameters $\tilde{\alpha }_k$ , where $\tilde{p}_{mk}, \tilde{\alpha }_k$ are given by

(8) \begin{align} \tilde{p}_{mk} & \propto \left (\frac{e^{S_{\boldsymbol{{e}}_{m1}} + \boldsymbol{{U}}_{\boldsymbol{{e}}_{m1}}\boldsymbol{{W}}^\prime _k}}{g_{uk}}\right ) \left (\frac{e^{R_{\boldsymbol{{e}}_{m2}} + \boldsymbol{{V}}_{\boldsymbol{{e}}_{m1}}\boldsymbol{{W}}^\prime _k}}{g_{vk} - e^{R_{\boldsymbol{{e}}_{m1}} + \boldsymbol{{V}}_{\boldsymbol{{e}}_{m1}}\boldsymbol{{W}}^\prime _k}}\right ) e^{\psi (\tilde{\alpha }_k) - \psi (\sum _k \tilde{\alpha }_k)} \nonumber \\[5pt] \tilde{\alpha }_k & = \alpha + \sum _{m = 1}^M \tilde{p}_{mk}, \end{align}

where $\psi$ is the digamma function.

We take a coordinate ascent approach to incrementally increase the $Q$ function given each E step’s output in the M step. The value of $\alpha$ to maximize $Q$ is obtained using a combination of golden section search and successive parabolic interpolation (Brent, 2005). The updates of $\{\boldsymbol{{S}}, \boldsymbol{{R}}, \boldsymbol{{U}}, \boldsymbol{{V}}, \boldsymbol{{W}}, \tau _S, \tau _R, \tau _U, \tau _V\}$ are performed in the same manner as in Sewell (Reference Sewell2021), with analytical solutions for the value of $\{\tau _S, \tau _R, \tau _U, \tau _V\}$ and conjugate gradient updates for $\{\boldsymbol{{S}}, \boldsymbol{{R}}, \boldsymbol{{U}}, \boldsymbol{{V}}, \boldsymbol{{W}}\}$ . Additionally, we use the same trick for computing the gradient in the LSEC paper to achieve a computational cost that grows linearly with the number of actors in a network. For details, see Appendix A.

To initialize the VB-GEM algorithm, we randomly generated $\boldsymbol{{S}}$ and $\boldsymbol{{R}}$ from a multivariate normal distribution with mean $\textbf{0}$ and variance $\mathcal{I}_n$ . We randomly sampled each row of $W$ from a multivariate normal distribution with mean $\textbf{0}$ and variance $\mathcal{I}_p$ . We initialized $U$ and $V$ using results from performing spectral embedding on the graph adjacency matrix. We initialized $\alpha$ at the prior mean $a_\alpha/b_\alpha$ ( $=1/200$ in our analyses). Convergence in the E step was evaluated by monitoring the changes in the ELBO. Convergence of the whole algorithm was determined based on the number of edges switching clusters between iterations. If 99.9% of the edges keep the same cluster assignment after the previous iteration, the algorithm will stop at the current iteration. To mitigate the fact that the performance of the general EM algorithm depends on the quality of the initialization, in the simulation study and real data analyses that follow, we ran the algorithm using 15 random starting points and chose the best model based on ICL (Biernacki et al., Reference Biernacki, Celeux and Govaert2000). Additionally, we set the hyperparameters such that $a_U=b_U=a_S =b_S=a_V=b_V=a_R=b_R=1$ . While researchers can set these values depending on the problem at hand, we found that varying them had minimal impact on the result (see Appendix C).

2.4 Gradient-based Monte Carlo

While the GEM approach quickly produces point estimates, it lacks uncertainty estimation. In this section, we introduce a Hamiltonian Monte Carlo-within-Gibbs algorithm to obtain estimates and quantify uncertainty. The full log posterior is given by

(9) \begin{align} l &\propto \sum _{m = 1}^M \sum _{k = 1}^K Z_{mk} \left [S_{\boldsymbol{{e}}_{m1}} + R_{\boldsymbol{{e}}_{m2}} + (\boldsymbol{{U}}_{\boldsymbol{{e}}_{m1}} + \boldsymbol{{V}}_{\boldsymbol{{e}}_{m2}})\boldsymbol{{W}}^\prime _k - \log (f_{uk}) - \log (f_{vk} - e^{R_{\boldsymbol{{e}}_{m1}} + \boldsymbol{{V}}_{\boldsymbol{{e}}_{m1}} \boldsymbol{{W}}^\prime _k}) \right ] \nonumber \\[5pt] &\quad +\log \Gamma (K\alpha ) - K\log \Gamma (\alpha ) + \sum _{k = 1}^K (\alpha + \sum _{m = 1}^M Z_{mk} - 1)\log \pi _k + (a_a - 1)\log \alpha - b_a\alpha \nonumber \\[5pt] &\quad - \frac{\tau _S}{2}||\boldsymbol{{S}}||^2 - \frac{\tau _R}{2}||\boldsymbol{{R}}||^2 - \frac{\tau _U}{2} ||\boldsymbol{{U}}||^2_F - \frac{\tau _V}{2} ||\boldsymbol{{V}}||^2_F - \frac{1}{2} ||\boldsymbol{{W}}||^2_F \nonumber \\[5pt] &\quad + \bigg (\frac{a_S + n}{2} - 1\bigg ) \log \tau _S - \frac{b_S}{2}\tau _S + \bigg (\frac{a_R + n}{2} - 1\bigg ) \log \tau _R - \frac{b_R}{2}\tau _S \nonumber \\[5pt] & \quad+ \bigg (\frac{a_U + nD}{2} - 1\bigg ) \log \tau _U - \frac{b_U}{2}\tau _U + \bigg (\frac{a_V + nD}{2} - 1\bigg ) \log \tau _V - \frac{b_V}{2}\tau _V. \end{align}

Due to semi-conjugacy, we can derive the full conditionals for $\boldsymbol{{Z}}_m$ , which is a multinomial distribution with probabilities proportional to

(10) \begin{align} \pi _k \frac{e^{S_{\boldsymbol{{e}}_{m1}} + R_{\boldsymbol{{e}}_{m2}} + (\boldsymbol{{U}}_{\boldsymbol{{e}}_{m1}} + \boldsymbol{{V}}_{\boldsymbol{{e}}_{m2}}) \boldsymbol{{W}}^\prime _k }}{f_{uk} (f_{vk} - e^{R_{\boldsymbol{{e}}_{m1}} + \boldsymbol{{V}}_{\boldsymbol{{e}}_{m1}} \boldsymbol{{W}}^\prime _k})}. \end{align}

Similarly, we derive the full conditionals of $\boldsymbol{\pi }$ and the precision parameters as follows.

(11) \begin{align} \boldsymbol{\pi }|\cdot &\sim \text{Dirichlet}\left(\alpha + \sum _{m=1}^M \boldsymbol{{Z}}_{m1}, \ldots, \alpha + \sum _{m=1}^M \boldsymbol{{Z}}_{mK}\right)\nonumber \\[5pt] \tau _S|\cdot &\sim \Gamma \left ( \frac{a_S + n}{2}, \frac{b_S + ||\boldsymbol{{S}}||^2}{2} \right ) \nonumber \\[5pt] \tau _R|\cdot &\sim \Gamma \left ( \frac{a_R + n}{2}, \frac{b_R + ||\boldsymbol{{R}}||^2}{2} \right ) \nonumber \\[5pt] \tau _U|\cdot &\sim \Gamma \left ( \frac{a_U + np}{2}, \frac{b_U + ||\boldsymbol{{U}}||^2_F}{2} \right ) \nonumber \\[5pt] \tau _V|\cdot &\sim \Gamma \left ( \frac{a_V + np}{2}, \frac{b_V + ||\boldsymbol{{V}}||^2_F}{2} \right ) \end{align}

For the remaining parameters $(\boldsymbol{{U}}, \boldsymbol{{V}}, \boldsymbol{{R}}, \boldsymbol{{S}}, \boldsymbol{{W}}, \alpha )$ , we use a Hamiltonian Monte Carlo (HMC) algorithm to draw from the posterior. Since the posterior samples of $\boldsymbol{\pi }$ might contain zero values, which result in an undefined log posterior, we take a collapsed Gibbs sampling approach and integrate out $\pi$ from the full conditionals of $(\boldsymbol{{U}}, \boldsymbol{{V}}, \boldsymbol{{S}}, \boldsymbol{{R}}, \boldsymbol{{W}}, \alpha )$ (Van Dyk & Park, Reference Van Dyk and Park2008). The gradients with respect to $(\boldsymbol{{U}}, \boldsymbol{{V}}, \boldsymbol{{R}}, \boldsymbol{{S}}, \boldsymbol{{W}})$ can be computed in the same efficient manner as in the LSEC paper. Further details on these gradients can be found in Appendix B. Since $\alpha$ is strictly positive, we apply a log transformation to $\alpha$ before carrying out the HMC algorithm. Let $\lambda \;:\!=\; \log \alpha$ , then the derivative of the reduced log posterior, which is the log posterior after integrating out $\boldsymbol{\pi }$ , with respect to $\lambda$ is given by

(12) \begin{align} Ke^\lambda \psi (Ke^\lambda ) - Ke^\lambda \psi (e^\lambda ) + e^\lambda \sum _{k = 1}^K \psi (e^\lambda + \sum _{m=1}^M \boldsymbol{{Z}}_{mk}) - Ke^\lambda \psi (Ke^\lambda + M) + a_a - b_a e^\lambda . \end{align}

The MCMC output suffers from several non-identifiablity issues. The likelihood does not change if one rescales $\boldsymbol{{W}}$ by a constant $c$ and then rescales $\boldsymbol{{U}}$ and $\boldsymbol{{V}}$ by $1/c$ . Additionally, the likelihood is invariant to translations of $\boldsymbol{{S}}, \boldsymbol{{R}}$ , and the columns of $\boldsymbol{{U}}$ and $\boldsymbol{{V}}$ . Like other latent space approaches, the latent actor positions $\boldsymbol{{U}}, \boldsymbol{{V}}$ and edge positions $\boldsymbol{{W}}$ are invariant to rotations, reflections, and translations. Lastly, the sparse finite mixture prior introduces the problem of aliasing of cluster labels and components.

To circumvent the non-identifiability issues, we post-process the MCMC output in six steps. Let the $^{(l)}$ superscript denote the $l$ th MCMC sample. First, we rescale $\boldsymbol{{W}}^{(l)}$ so that the elements of $\boldsymbol{{W}}^{(l)}$ have unit variance and then rescale $\boldsymbol{{U}}^{(l)}, \boldsymbol{{V}}^{(l)}, \tau _U^{(l)}$ , and $\tau _V^{(l)}$ accordingly. Second, we keep draws where the number of clusters equals the MAP estimate and discard the rest (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2016). Third, we remove the rows in $\boldsymbol{{W}}$ and elements in $\boldsymbol{\pi }$ corresponding to empty components in each sample (Malsiner-Walli et al., Reference Malsiner-Walli, Frühwirth-Schnatter and Grün2016). Fourth, we run the equivalence classes representatives algorithm to match cluster assignment in each sample to the MAP estimate and then reorder rows of $\boldsymbol{{W}}$ and elements in $\pi$ according to permuted cluster label (Papastamoulis & Iliopoulos, Reference Papastamoulis and Iliopoulos2010). Fifth, we apply a Procrustes transformation (Borg & Groenen, Reference Borg and Groenen2005) to rotate $\boldsymbol{{U}}^{(l)}, \boldsymbol{{V}}^{(l)}$ and $\boldsymbol{{W}}^{(l)}$ using the MAP as the reference matrix. Finally, we recenter $\boldsymbol{{S}}^{(l)}$ and $\boldsymbol{{R}}^{(l)}$ and the columns of $\boldsymbol{{U}}^{(l)}$ and $\boldsymbol{{V}}^{(l)}$ in each sample.

3. Simulation

We performed a simulation study to compare the clustering performance of our proposed algorithm to the existing approaches described below. There were twenty different scenarios assuming a different combination of the number of actors $n \in \{200, 400\}$ , the true $K$ (ranging from 2 to 6), and $p$ (ranging from 2 to 3). For each scenario, we generated 200 network data sets. Each network had a density of 0.05, which translated to 1990 edges when $n=200$ and 7980 edges when $n=400$ .

Given that indegree and outdegree are often highly correlated, each pair $(S_i, R_i)$ was sampled from a bivariate normal distribution with mean $\textbf{0}$ , variances $2$ and correlation $0.75$ . The matrix representing the edge cluster latent positions $\boldsymbol{{W}}$ was generated such that its row vectors $\boldsymbol{{W}}_k$ ’s were equally spaced on a circle when the true $p$ = 2 and on a sphere when the true $p$ = 3. The directions of the row vectors $\boldsymbol{{U}}_i$ ’s and $\boldsymbol{{V}}_i$ ’s were drawn from mixtures of von Mises-Fisher distributions with the mean directions coinciding with the direction of a $\boldsymbol{{W}}_k$ chosen with equal probability. Their magnitudes followed a Gamma distribution with shape 20 and rate 4, which we found from trial and error to encourage a reasonable level of clustering in the resulting networks. Across the twenty configurations, we set the concentrations of the mixtures of von Mises-Fisher distributions to achieve a similar degree of clustering in the network structure. This was measured by obtaining similar average values of edge assortativity (that is, the assortativity of the line graph using the edge cluster assignments as attributes), ranging between 0.6 and 0.8 across the ten different scenarios. Each edge cluster assignment $\boldsymbol{{Z}}_m$ was drawn from a multinomial distribution with equal event probabilities of $1/K$ where $K$ was the correct number of clusters. An example of a simulated network when $(n=400, K=6, p=2)$ is shown in Figure 2, where different edge colors correspond to different clusters.

Figure 2. Example of simulated network where $n = 400, K = 6, p = 2$ . Edges are colored according to their cluster assignment. The network layout is set to show the six different edge clusters clearly.

Clustering results of the proposed approach were compared with other methods, including the original LSEC (Sewell, Reference Sewell2021), the mixed-membership blockmodeling method proposed by Ball et al. (Reference Ball, Karrer and Newman2011) (BKN), and spectral clustering on a line graph (LG). Our approach always assumed that $p=3$ . We describe later a sensitivity analysis which shows that this appears to be a sound practice. The results from LSEC were based on running the double model selection approach in Sewell (Reference Sewell2021), performing estimation over a range of values for $K$ (ranging from 2 to 10) and $p$ (ranging from 2 to 5) and using both AIC and ICL to select a final model. There were no obvious ways to choose $K$ and $p$ for BKN and LG, and hence, we fit the oracle model assuming the true $K$ and $p$ were known. It is important to note that the results from BKN and LG are overestimates due to both of these methods being provided the true $K$ and $p$ . We refer to our proposed algorithm as the automated LSEC or aLSEC.

Table 1. Clustering results of comparing aLSEC (assuming $p$ = 3) with the existing methods. For both NMI and ARI, the higher the values, the better

The highest values of NMI and ARI in each scenario are bolded.

We evaluated clustering performance via normalized mutual information (NMI) (Danon et al., Reference Danon, Díaz-Guilera, Duch and Arenas2005) and adjusted Rand index (ARI) (Hubert & Arabie, Reference Hubert and Arabie1985). The results are summarized in Table 1. Our proposed aLSEC method outperformed BKN and LG in all scenarios except when $K=2$ , despite both of these methods being provided knowledge of the true $K$ and $p$ . Compared to LSEC, aLSEC had similar or improved performance. The primary benefit of aLSEC over LSEC is the reduced computational cost. We investigated the ratio of running time of LSEC over aLSEC. We found that implementing aLSEC can reduce the run time by 10 to over 100 times compared to fitting the original LSEC model (Figure 3). In each simulation scenario, the majority of this ratio fell between 20 and 70 when $n=200$ , and between 20 and 40 when $n=400$ (Figure 3).

Figure 3. The ratios of the run time of the LSEC method over our aLSEC method.

We carried out a sensitivity analysis and found that there was little harm in overestimating the dimension of the latent space, especially when the actual number of clusters was large (Table 2). This finding is not overly surprising since setting $p$ to be larger than the actual value has the potential to perfectly capture the latent space information embedded in a lower-dimensional space. We fixed the latent dimension to be $p = 3$ when fitting aLSEC in the simulation study. In practice, we would wish to visualize the latent space and save resources testing different values of $p's$ while still obtaining reasonably good clustering results.

Table 2. Sensitivity analysis assuming different values of $p$ for aLSEC (represented by the different columns). The NMI values are averaged over 200 simulated networks. The higher the NMI values, the better

4. Real network data analyses

4.1 Patient transfer network

We explored disease transmission in a patient transfer network between hospitals in California, which had 372 nodes and 12,853 directed edges (Justice et al., Reference Justice, Sewell, Miller, Simmering and Polgreen2022). Each node in the network represented a hospital. There was an edge from node $i$ to node $j$ if more than two patients were transferred from hospital $i$ to hospital $j$ during the seven years of the study. The threshold (e.g., two patients) was chosen based on a visual examination of the relationship between different cutoffs and the density of the resulting network graph to remove superfluous patient transfers from the network. The patient transfer data are available from the Healthcare Cost and Utilization Project (HCUP) State Inpatient Databases (SID).Footnote 2 HCUP data are available for a fee to all researchers following a standard application process and signing of a data use agreement.

Transfer patients have been shown to have significantly contributed to infectious disease outbreaks (Donker et al., Reference Donker, Wallinga, Slack and Grundmann2012). Therefore, understanding the system of flows in this network will be helpful for public health officials and healthcare professionals to identify which transfer patients to screen or isolate in such events. For example, if a transfer patient, which corresponds to an edge in this network, tests positive for an infectious disease, it would be of great importance for hospitals within the region to know which other transfer patients to screen and isolate to prevent further spread.

Running the GEM algorithm with $p=3$ revealed six clusters, shown in Figure 4. The MAP estimates of the latent position $\boldsymbol{{U}}$ ’s were shown along with the edge cluster assignments. Since there was no ground truth in this data set, we carried out epidemic simulations similar to those done by Sewell (Reference Sewell2021) and examined the results. Each simulation started with infecting one hospital and allowed the transmission to spread via patient transfers between hospitals in the network. The period an infected hospital remains exposed was generated from a gamma distribution with a mean of 7 days and a standard deviation of 1 day. After exposure, the infected hospital became infectious and could transmit disease to other hospitals. The probability of a transfer patient carrying disease was assumed to be 0.1.

Figure 4. Results of applying aLSEC to the patient transfer network of California. Each point represents the MAP estimate latent position $\boldsymbol{{U}}$ of each actor. Edges are colored according to their cluster assignment.

Figure 5(a) shows one archetypal example of the epidemic simulation results, noting that all other simulations were qualitatively similar. At each time point $t$ , we calculated the cumulative number of edges in each cluster that had contributed to spreading infection. Once the disease entered an edge cluster, there was a rapid increase in the number of edges carrying transmission, followed by a plateau indicating that most of the edges in the group had already acted to transmit the disease. In contrast, Figure 5(b) shows the same epidemic simulation but with the cluster label randomly permuted. The increase in the number of edges carrying disease within each edge cluster was more gradual, implying that the permuted cluster labels failed to capture the systems of flows in the network.

Figure 5. Results of running epidemic simulation on the network with edges labeled according to aLSEC results (a) and randomly (b). Each curve showed the number of edges carrying the transmission of a cluster over time.

4.2 UK faculty data

We applied the proposed method to a friendship network of UK university faculty, which consists of 81 nodes and 817 directed edges (Nepusz et al., Reference Nepusz, Petróczi, Négyessy and Bazsó2008). Faculty members came from three different schools within the university. The school affiliation was known for all but two individuals. The UK Faculty data are publicly available as part of the igraphdata package in R (Csardi, Reference Csardi2015). The code to perform data analysis can be found online.Footnote 3

We ran the HMC-within Gibbs algorithm on the UK faculty network, keeping every fifth iteration and obtaining $30,000$ samples. We then discarded the first $10,000$ samples, which we considered as a burn-in period. Figure 6 shows the posterior distribution of the number of clusters. Unlike the original LSEC approach, our approach allows for estimation of uncertainty associated with the estimated number of clusters $K$ . There is an overwhelming posterior probability supporting $K=4$ .

Figure 6. Posterior distribution of the number of clusters $K$ after applying HMC-within-Gibbs algorithm to UK Faculty network.

After applying the post-processing steps, we examined the clustering results where the number of clusters $K=4$ . Figure 7 shows the MAP estimate of the latent position $\boldsymbol{{U}}$ Footnote 4 of each actor, while edges are colored according to the MAP edge partition. Each shape of the node corresponds to each school to which each faculty belongs. The first three edge clusters in Figure 7(a), (b), and (c) mainly captured the within-school connections, while the last cluster Figure 7(d) represented the interaction across different schools. The results indicate that aLSEC is uncovering the hidden contexts in which the friendships are formed.

Figure 7. The MAP estimate of the latent positions $\boldsymbol{{U}}$ . Edge colors correspond to the MAP edge partition. The three hollow shapes represent the three schools. The two solid circles represent the two individuals who did not mention their schools.

Our MCMC algorithm allows us to quantify the uncertainty in any model parameter, including the cluster assignment. Let $P_{M \times M}$ be a matrix where each entry $P_{ij}$ represents the posterior probabilities of any two edges $i$ and $j$ sharing the same cluster. Let $L$ denote the total number of post-processed MCMC samples, we calculated $P_{ij}$ as follows.

\begin{align*} P_{ij} = \frac{1}{L}\sum _{l=1}^L \mathbf{1}_{[\boldsymbol{{Z}}_i^{(l)} = \boldsymbol{{Z}}_j^{(l)}]} \end{align*}

Since we did not know the school affiliations of two individuals, we momentarily excluded these two actors and their corresponding connections. We then reordered the rows and columns of $P$ into four blocks, where each of the first three blocks consisted of edges corresponding to within-school connections and the fourth block consisted of the remaining edges representing inter-school connections. The sizes of the four blocks were 317, 250, 96, and 152, respectively. Figure 8 is a heat map showing the posterior probabilities of edges sharing clusters after reordering, where darker colors indicate higher probabilities. A block structure is clearly shown on the diagonal, implying that the clustering assignment is similar across different samples.

Figure 8. Heat map of the $P_{M \times M}$ matrix showing the posterior probabilities of any two edges sharing the same cluster. Darker colors imply higher probabilities. From left to right, edges are ordered into blocks, such as the first three blocks (size $317, 250, 96$ ) are of edges representing within-school connections and the last block (size $152$ ) is of edges representing inter-school connections.

5. Discussion

Despite receiving little attention in the community detection literature, edge clustering has the potential to provide an understanding of the network structure that is intuitive and easy to interpret. As shown in the applications of aLSEC to real data, identifying clusters of edges can reveal systems of flows in a network and contexts in which edge form. Sewell proposed a latent space edge clustering approach (LSEC) and showed favorable results when applying LSEC to both artificial and real networks. Nevertheless, implementing LSEC requires fitting the model multiple times to obtain the best result. This paper presents an automatic LSEC approach using an overfitted mixture model prior to simultaneously estimate the number of clusters and cluster-specific variables. Fitting aLSEC models using a GEM approach drastically reduces the computational cost, averaging between 20 and 70 times as shown in the simulation study, and sometimes the computational gains can be up to a hundredfold.

To overcome the challenge of implementing aLSEC efficiently, we derive a variational Bayes GEM algorithm and an HMC-within Gibbs algorithm for estimation, both of which are efficient and have a computational cost that grows linearly with the number of actors in sparse networks. Our simulation study showed that aLSEC performed similar to or better than the original LSEC method but took 10–100 times less time to implement. We examined the sensitivity of the clustering results to different values of the number of dimensions $p$ and found that there was little to no penalty in overspecifying this value. We further applied our method to analyzing patient transfer network and UK faculty network data. In the first application, our method successfully captured the systems of flows and informed us about how disease spreads in the network. In the second application, our approach revealed information about the context from which edges are formed.

Despite the promising performance, there are some limitations to our proposed method. We have yet to directly tackle the issue of specifying the number of latent dimensions $p$ . While the sensitivity results show good performance when overspecifying $p$ , more research is needed to understand the impact of using incorrect values of $p$ on clustering performance. Another limitation is the selection of the hyperparameters for the Gamma priors. Here, we demonstrated some success by using the same prior as Frühwirth-Schnatter & Malsiner-Walli (Reference Frühwirth-Schnatter and Malsiner-Walli2019), but the same setup was not guaranteed to work for every situation. Further knowledge of shrinkage priors in the sparse finite mixture model will help guide appropriate prior choices for future applications. Lastly, an important area for future work is to develop a goodness-of-fit measure supported by rigorous statistical methods, such as Bayesian p-values, in order to evaluate the appropriateness of LSEC or aLSEC to the data.

Supplementary material.

The supplementary material for this article can be found at https://doi.org/10.1017/nws.2023.22.

Competing interests.

None.

Data availability statement.

The patient transfer data are available from the Healthcare Cost and Utilization Project (HCUP) State Inpatient Databases (SID) (https://www.hcup-us.ahrq.gov/sidoverview.jsp). HCUP data are available for a fee to all researchers following a standard application process and signing of a data use agreement. The UK Faculty data are publicly available as part of the {igraphdata} package in R. The code to perform data analysis can be found online at https://github.com/hanhtdpham/aLSEC.

Funding statement.

This research received no specific grant from any funding agency, commercial, or not-for-profit sectors.

Footnotes

4 $\boldsymbol{{U}}$ and $\boldsymbol{{V}}$ are highly correlated so plotting either one will produce almost the same plot.

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Figure 0

Figure 1. Relationship between parameters in the LSEC model (circles) and parameters in the proposed extension (rectangles).

Figure 1

Figure 2. Example of simulated network where $n = 400, K = 6, p = 2$. Edges are colored according to their cluster assignment. The network layout is set to show the six different edge clusters clearly.

Figure 2

Table 1. Clustering results of comparing aLSEC (assuming $p$ = 3) with the existing methods. For both NMI and ARI, the higher the values, the better

Figure 3

Figure 3. The ratios of the run time of the LSEC method over our aLSEC method.

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Table 2. Sensitivity analysis assuming different values of $p$ for aLSEC (represented by the different columns). The NMI values are averaged over 200 simulated networks. The higher the NMI values, the better

Figure 5

Figure 4. Results of applying aLSEC to the patient transfer network of California. Each point represents the MAP estimate latent position $\boldsymbol{{U}}$ of each actor. Edges are colored according to their cluster assignment.

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Figure 5. Results of running epidemic simulation on the network with edges labeled according to aLSEC results (a) and randomly (b). Each curve showed the number of edges carrying the transmission of a cluster over time.

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Figure 6. Posterior distribution of the number of clusters $K$ after applying HMC-within-Gibbs algorithm to UK Faculty network.

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Figure 7. The MAP estimate of the latent positions $\boldsymbol{{U}}$. Edge colors correspond to the MAP edge partition. The three hollow shapes represent the three schools. The two solid circles represent the two individuals who did not mention their schools.

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Figure 8. Heat map of the $P_{M \times M}$ matrix showing the posterior probabilities of any two edges sharing the same cluster. Darker colors imply higher probabilities. From left to right, edges are ordered into blocks, such as the first three blocks (size $317, 250, 96$) are of edges representing within-school connections and the last block (size $152$) is of edges representing inter-school connections.

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