Gibbs-type Indian buffet processes
Abstract
We investigate a class of feature allocation models that generalize the Indian buffet process and are parameterized by Gibbs-type random measures. Two existing classes are contained as special cases: the original two-parameter Indian buffet process, corresponding to the Dirichlet process, and the stable (or three-parameter) Indian buffet process, corresponding to the Pitman--Yor process. Asymptotic behavior of the Gibbs-type partitions, such as power laws holding for the number of latent clusters, translates into analogous characteristics for this class of Gibbs-type feature allocation models. Despite containing several different distinct subclasses, the properties of Gibbs-type partitions allow us to develop a black-box procedure for posterior inference within any subclass of models. Through numerical experiments, we compare and contrast a few of these subclasses and highlight the utility of varying power-law behaviors in the latent features.
Cite
@article{arxiv.1512.02543,
title = {Gibbs-type Indian buffet processes},
author = {Creighton Heaukulani and Daniel M. Roy},
journal= {arXiv preprint arXiv:1512.02543},
year = {2019}
}
Comments
27 pages, 5 figures