English

Multiscale Bernstein polynomials for densities

Methodology 2014-10-06 v1

Abstract

Our focus is on constructing a multiscale nonparametric prior for densities. The Bayes density estimation literature is dominated by single scale methods, with the exception of Polya trees, which favor overly-spiky densities even when the truth is smooth. We propose a multiscale Bernstein polynomial family of priors, which produce smooth realizations that do not rely on hard partitioning of the support. At each level in an infinitely-deep binary tree, we place a beta dictionary density; within a scale the densities are equivalent to Bernstein polynomials. Using a stick-breaking characterization, stochastically decreasing weights are allocated to the finer scale dictionary elements. A slice sampler is used for posterior computation, and properties are described. The method characterizes densities with locally-varying smoothness, and can produce a sequence of coarse to fine density estimates. An extension for Bayesian testing of group differences is introduced and applied to DNA methylation array data.

Keywords

Cite

@article{arxiv.1410.0827,
  title  = {Multiscale Bernstein polynomials for densities},
  author = {Antonio Canale and David B. Dunson},
  journal= {arXiv preprint arXiv:1410.0827},
  year   = {2014}
}
R2 v1 2026-06-22T06:12:26.114Z