Telescoping mixtures - Learning the number of components and data clusters in Bayesian mixture analysis

Aktivität: VortragWissenschaftlicher Vortrag (Science-to-Science)

Beschreibung

Telescoping mixtures are an extension of sparse finite mixtures by assuming that additional to the unknown number of data clusters also the number of mixture components is unknown and has to be estimated. Telescoping mixtures explicitly distinguish between the number of data clusters K+ and components K in the mixture distribution, and purposely allow for more components than data clusters. By linking the prior on the number of components to the prior on the mixture weights, it is guaranteed that components remain empty as K increases, making the number of clusters in the data, defined through the partition implied by the allocation variables, random a priori. Telescoping mixtures can be seen as an alternative to infinite mixtures models. We present a simple algorithm for posterior MCMC sampling to jointly sample K, the number of components, and K+, the number of data clusters. The algorithm is compared to standard transdimensional algorithm such as the reversible jump Markov chain Monte Carlo and the Jain-Neal split-merge sampler.
Zeitraum26 Aug. 201929 Aug. 2019
Ereignistitel16th Conference of the International Federation of Classification Societies
VeranstaltungstypKeine Angaben
BekanntheitsgradInternational

Österreichische Systematik der Wissenschaftszweige (ÖFOS)

  • 101018 Statistik