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Hierarchical Beta Process and the Indian Buffet Process by R. Thibaux and M. I. Jordan Discussion led by Qi An Outline • • • • • • • Introduction Indian buffet process (IBP) Beta process (BP) Connections between IBP and BP Hierarchical beta process (hBP) Application to document classification Conclusions Introduction • Mixture models VS. – Each data is drawn from one mixture component – Number of mixture components is not set a prior – Distribution over partitions • Factorial models – Each data is associated with a set of latent Bernoulli variables – Cardinality of the set of features can vary – A “featural” description of objects – A natural way to define interesting topologies on cluster – May be appropriate for large number of clusters Beta process Beta process is a special case of independent increment process, or Levy process, Levy process can be characterized by Levy measure. For beta process, it is If we draw a set of points (wi , pi ) [0,1] from a Poisson process with base measure v, then As the representation shows, B is discrete with probability one. When the base measure B0 is discrete: B0 qi w , then B has atoms at the same i locations B pi w with pi ~ Beta(cqi , c(1 qi )) i i i Bernoulli process Here, Ω can be viewed as a set of potential features and the random measure B defines the probability that X can possess particular feature. In Indian buffet process, X is the customer and its features are the dishes the customer taste. Connections between IBP and BP It is proven that the observations from a beta process satisfy Procedure: The first customer will try Poi(γ) number of dishes (feature). After that , the new observation can taste previous dish j with probability and then try a number of new features where is the total mass As a result, beta process is a two-parameter (c, γ) generalization of the Indian buffet process. IBP=BP(c=1, γ=α) The total number of unique dishes can be roughly represented as This quantity becomes Poi(γ) if c0 (all customers share the same dishes) or Poi(n γ) if c∞ (no sharing). An algorithm to generate beta process Authors propose to generate an approximation, Let For each step n≥1 , of B Hierarchical beta process Consider a document classification problem. We have a training data set X, which is a list of documents. Each document is classified by one of n topics. We model a document by the set of words it contains. We assume document Xi,j is generated by including each word w independently with a probability pjw specific to topic j. These probabilities form a discrete measure Aj over all word space Ω. We can put a beta process BP(cj,B) prior on Aj. Since we want the sharing across different topics, B has to be discrete. We thus put a beta process prior BP(c0,B0) on B, which allows sharing the same atoms among topics. The HBP model can be summarized as: This model can be solved with Monte Carlo inference algorithm. Applications • Authors applied the hierarchical beta process to a document classification problem • Compare it to the Naïve Bayes (with Laplace smoothing) results • The hBP model can obtain 58% result while the best Naïve Bayes result is 50% Conclusions • The beta process is shown to be suitable for nonparametric Bayesian factorial modeling • The beta process can be extended to a recursively-defined hierarchy of beta process • Compared to the Dirichlet process, the beta process has the potential advantage of being an independent increments process • More work on inference algorithm is necessary to fully exploit beta process models.