Finite Mixture Model
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A Finite Mixture Model is a mixture model that define a set of finite mixture function (with a finite number mixture components).
- AKA: Finite Mixture Statistical Model Family.
- Context:
- It can range from (typically) being a Finite Mixture Density Model (for a mixture density function) to being a Finite Mixture Distribution Model (for a mixture mass function).
- It can range from being a Two-Component Finite Mixture Model to a Many-Component Finite Mixture Model.
- It can be an task input to a Finite Mixture Modeling Task.
- It can be useful for:
- estimating multimodal or heavy-tailed densities
- fitting zero-inflated or hurdle models to count data with excess zeros
- modeling overdispersed data
- fitting regression models with complex error distributions
- classifying observations based on predicted component probabilities
- accounting for unobservable omitted variables
- estimating switching regressions
- See: Infinite Mixture Model, Latent Factor Models.
References
1997
- (Friedman & Russell, 1997) ⇒ Nir Friedman, and Stuart J. Russell. (1997). “Image Segmentation in Video Sequences: A Probabilistic Approach.” In: Proceedings of the Thirteenth conference on Uncertainty in artificial intelligence.
1994
- (Bailey & Elkan, 1994) ⇒ Timothy L Bailey, and Charles Elkan. (1994). “Fitting a Mixture Model by Expectation Maximization to Discover Motifs in Bipolymers." In: Proceedings of the Second International Conference on Intelligent Systems for Molecular Biology (ISMB 1994).