English

An Operator Theoretic Approach to Nonparametric Mixture Models

Machine Learning 2016-10-14 v2 Statistics Theory Statistics Theory

Abstract

When estimating finite mixture models, it is common to make assumptions on the mixture components, such as parametric assumptions. In this work, we make no distributional assumptions on the mixture components and instead assume that observations from the mixture model are grouped, such that observations in the same group are known to be drawn from the same mixture component. We precisely characterize the number of observations nn per group needed for the mixture model to be identifiable, as a function of the number mm of mixture components. In addition to our assumption-free analysis, we also study the settings where the mixture components are either linearly independent or jointly irreducible. Furthermore, our analysis considers two kinds of identifiability -- where the mixture model is the simplest one explaining the data, and where it is the only one. As an application of these results, we precisely characterize identifiability of multinomial mixture models. Our analysis relies on an operator-theoretic framework that associates mixture models in the grouped-sample setting with certain infinite-dimensional tensors. Based on this framework, we introduce general spectral algorithms for recovering the mixture components and illustrate their use on a synthetic data set.

Keywords

Cite

@article{arxiv.1607.00071,
  title  = {An Operator Theoretic Approach to Nonparametric Mixture Models},
  author = {Robert A. Vandermeulen and Clayton D. Scott},
  journal= {arXiv preprint arXiv:1607.00071},
  year   = {2016}
}

Comments

Contains and greatly extends the results from our previous work, arXiv:1502.06644, and thus contains some overlap with that work. This version contains some small grammatical and technical corrections as well as some changes for improved clarity

R2 v1 2026-06-22T14:40:15.211Z