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Latent Network Structure Learning From High-Dimensional Multivariate Point Processes

Biao Cai, Jingfei Zhang, Yongtao Guan

2022Journal of the American Statistical Association16 citationsDOIOpen Access PDF

Abstract

Learning the latent network structure from large scale multivariate point process data is an important task in a wide range of scientific and business applications. For instance, we might wish to estimate the neuronal functional connectivity network based on spiking times recorded from a collection of neurons. To characterize the complex processes underlying the observed data, we propose a new and flexible class of nonstationary Hawkes processes that allow both excitatory and inhibitory effects. We estimate the latent network structure using an efficient sparse least squares estimation approach. Using a thinning representation, we establish concentration inequalities for the first and second order statistics of the proposed Hawkes process. Such theoretical results enable us to establish the non-asymptotic error bound and the selection consistency of the estimated parameters. Furthermore, we describe a least squares loss based statistic for testing if the background intensity is constant in time. We demonstrate the efficacy of our proposed method through simulation studies and an application to a neuron spike train dataset. Supplementary materials for this article are available online.

Topics & Concepts

Point processComputer scienceMultivariate statisticsLatent variableStatisticArtificial intelligenceConsistency (knowledge bases)Spike (software development)Representation (politics)Data miningMachine learningAlgorithmMathematicsStatisticsSoftware engineeringPoliticsLawPolitical sciencePoint processes and geometric inequalitiesDiffusion and Search DynamicsMorphological variations and asymmetry