Abstract
In this article, we revisit the problem of fitting a mixture model under the assumption that the mixture components are symmetric and log-concave. To this end, we first study the nonparametric maximum likelihood estimation (MLE) of a monotone log-concave probability density. To fit the mixture model, we propose a semiparametric EM (SEM) algorithm, which can be adapted to other semiparametric mixture models. In our numerical experiments, we compare our algorithm to that of Balabdaoui and Doss (2018, Inference for a two-component mixture of symmetric distributions under log-concavity. Bernoulli 24 (2):1053–71) and other mixture models both on simulated and real-world datasets.
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