JOURNAL ARTICLE
Latent factor models for density estimation
Suprateek KunduDavid B. Dunson
Year: 2014 Journal: Biometrika Vol: 101 (3)Pages: 641-654 Publisher: Oxford University Press
Abstract
Although discrete mixture modelling has formed the backbone of the literature on Bayesian density estimation, there are some well-known disadvantages. As an alternative to discrete mixtures, we propose a class of priors based on random nonlinear functions of a uniform latent variable with an additive residual. The induced prior for the density is shown to have desirable properties, including ease of centring on an initial guess, large support, posterior consistency and straightforward computation via Gibbs sampling. Some advantages over discrete mixtures, such as Dirichlet process mixtures of Gaussian kernels, are discussed and illustrated via simulations and an application.
Keywords:
Mathematics Gibbs sampling Dirichlet process Prior probability Density estimation Dirichlet distribution Centring Latent variable Applied mathematics Consistency (knowledge bases) Mixture model Computation Bayesian probability Algorithm Statistics Mathematical analysis Estimator
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15
Cited By
2.41
FWCI (Field Weighted Citation Impact)
38
Refs
0.90
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Citation History
Topics
Bayesian Methods and Mixture Models
Physical Sciences → Computer Science → Artificial Intelligence
Statistical Methods and Bayesian Inference
Physical Sciences → Mathematics → Statistics and Probability
Gaussian Processes and Bayesian Inference
Physical Sciences → Computer Science → Artificial Intelligence
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