English

Random Function Priors for Correlation Modeling

Machine Learning 2019-05-14 v2 Machine Learning

Abstract

The likelihood model of high dimensional data XnX_n can often be expressed as p(XnZn,θ)p(X_n|Z_n,\theta), where θ:=(θk)k[K]\theta\mathrel{\mathop:}=(\theta_k)_{k\in[K]} is a collection of hidden features shared across objects, indexed by nn, and ZnZ_n is a non-negative factor loading vector with KK entries where ZnkZ_{nk} indicates the strength of θk\theta_k used to express XnX_n. In this paper, we introduce random function priors for ZnZ_n for modeling correlations among its KK dimensions Zn1Z_{n1} through ZnKZ_{nK}, which we call \textit{population random measure embedding} (PRME). Our model can be viewed as a generalized paintbox model~\cite{Broderick13} using random functions, and can be learned efficiently with neural networks via amortized variational inference. We derive our Bayesian nonparametric method by applying a representation theorem on separately exchangeable discrete random measures.

Cite

@article{arxiv.1905.03826,
  title  = {Random Function Priors for Correlation Modeling},
  author = {Aonan Zhang and John Paisley},
  journal= {arXiv preprint arXiv:1905.03826},
  year   = {2019}
}

Comments

Accepted by ICML 2019. 13 pages, 6 figures

R2 v1 2026-06-23T09:02:10.950Z