Litcius/Paper detail

Statistical convergence of the EM algorithm on Gaussian mixture models

Ruofei Zhao, Yuanzhi Li, Yuekai Sun

2020Electronic Journal of Statistics34 citationsDOIOpen Access PDF

Abstract

We study the convergence behavior of the Expectation Maximization (EM) algorithm on Gaussian mixture models with an arbitrary number of mixture components and mixing weights. We show that as long as the means of the components are separated by at least $\Omega (\sqrt{\min \{M,d\}})$, where $M$ is the number of components and $d$ is the dimension, the EM algorithm converges locally to the global optimum of the log-likelihood. Further, we show that the convergence rate is linear and characterize the size of the basin of attraction to the global optimum.

Topics & Concepts

MathematicsExpectation–maximization algorithmMixture modelMixing (physics)Dimension (graph theory)Convergence (economics)OmegaGaussianRate of convergenceMaximizationAlgorithmApplied mathematicsCombinatoricsMaximum likelihoodMathematical optimizationStatisticsKey (lock)Computer scienceQuantum mechanicsPhysicsEconomic growthComputer securityEconomicsBayesian Methods and Mixture ModelsStatistical Methods and InferenceStatistical Methods and Bayesian Inference