ppsbm0.2.2 package

Clustering in Longitudinal Networks

ARI

Adjusted Rand Index (ARI)

bootstrap_and_CI

Bootstrap and Confidence Interval

classInd

Function for k-means

confidenceInterval

Confidence Interval

convertGroupPair

Convert group pair (q,l)(q,l)

convertNodePair

Convert node pair (i,j)(i,j)

correctTau

Handling of values of τ\tau

find_ql

Convert index into group pair

find_ql_diff

Convert index into group pair in tauDown_Q

generateDynppsbm

Data under dynppsbm

generateDynppsbmConst

Data under dynppsbm with piecewise constant intensities

generatePP

Poisson process

generatePPConst

Poisson process with piecewise constant intensities

JEvalMstep

Evaluation of criterion J

kernelIntensities

Direct kernel estimator intensities

listNodePairs

List node pairs

mainVEM

Adaptative VEM algorithm

mainVEMPar

VEM step for parallel version

modelSelec_QPlot

Plots for model selection

modelSelection_Q

Selects the number of groups with ICL

Mstep_hist

M step for histograms

Mstep_kernel

M step for kernel

permuteZEst

Optimal matching between 2 clusterings

sortIntensities

Sort intensities

statistics

Compute statistics

tauDown_Q

Construct initial τ\tau from Q+1Q+1

tauInitial

List of initial values for τ\tau

tauKmeansSbm

k-means for SBM

taurhoInitial

Sparse setup - ρ\rho parameter

tauUp_Q

Construct initial τ\tau from Q1Q-1

tauUpdate

Update τ\tau

VEstep

VE step

Download source packageRead PDF manual

Stochastic block model used for dynamic graphs represented by Poisson processes. To model recurrent interaction events in continuous time, an extension of the stochastic block model is proposed where every individual belongs to a latent group and interactions between two individuals follow a conditional inhomogeneous Poisson process with intensity driven by the individuals’ latent groups. The model is shown to be identifiable and its estimation is based on a semiparametric variational expectation-maximization algorithm. Two versions of the method are developed, using either a nonparametric histogram approach (with an adaptive choice of the partition size) or kernel intensity estimators. The number of latent groups can be selected by an integrated classification likelihood criterion. Y. Baraud and L. Birgé (2009). <doi:10.1007/s00440-007-0126-6>. C. Biernacki, G. Celeux and G. Govaert (2000). <doi:10.1109/34.865189>. M. Corneli, P. Latouche and F. Rossi (2016). <doi:10.1016/j.neucom.2016.02.031>. J.-J. Daudin, F. Picard and S. Robin (2008). <doi:10.1007/s11222-007-9046-7>. A. P. Dempster, N. M. Laird and D. B. Rubin (1977). <http://www.jstor.org/stable/2984875>. G. Grégoire (1993). <http://www.jstor.org/stable/4616289>. L. Hubert and P. Arabie (1985). <doi:10.1007/BF01908075>. M. Jordan, Z. Ghahramani, T. Jaakkola and L. Saul (1999). <doi:10.1023/A:1007665907178>. C. Matias, T. Rebafka and F. Villers (2018). <doi:10.1093/biomet/asy016>. C. Matias and S. Robin (2014). <doi:10.1051/proc/201447004>. H. Ramlau-Hansen (1983). <doi:10.1214/aos/1176346152>. P. Reynaud-Bouret (2006). <doi:10.3150/bj/1155735930>.