Parameter Expanded Variational Bayesian Methods

Abstract

Bayesian inference has become increasingly important in statistical machine learning. Exact Bayesian calculations are often not feasible in practice, however. A number of approximate Bayesian methods have been proposed to make such calculations practical, among them the variational Bayesian (VB) approach. The VB approach, while useful, can nevertheless suffer from slow convergence to the approximate solution. To address this problem, we propose Parameter-eXpanded Variational Bayesian (PX-VB) methods to speed up VB. The new algorithm is inspired by parameter-expanded expectation maximization (PX-EM) and parameterexpanded data augmentation (PX-DA). Similar to PX-EM and -DA, PX-VB expands a model with auxiliary variables to reduce the coupling between variables in the original model. We analyze the convergence rates of VB and PX-VB and demonstrate the superior convergence rates of PX-VB in variational probit regression and automatic relevance determination.

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Document Details

Document Type
Technical Report
Publication Date
Mar 13, 2009
Accession Number
ADA628531

Entities

People

  • Tommi S. Jaakkola
  • Yaun Qi

Organizations

  • Massachusetts Institute of Technology

Tags

Communities of Interest

  • Autonomy
  • C4I

DTIC Thesaurus Topics

  • Algorithms
  • Artificial Intelligence
  • Automatic
  • Bayesian Inference
  • Bayesian Networks
  • Computational Science
  • Convergence
  • Couplings
  • Data Science
  • Data Sets
  • Eigenvalues
  • Equations
  • Information Science
  • Learning
  • Machine Learning
  • Maximum Likelihood Estimation
  • Statistics

Readers

  • Calculus or Mathematical Analysis
  • Materials Science and Engineering.
  • Statistical inference.

Technology Areas

  • AI & ML
  • AI & ML - Bayesian Inference
  • AI & ML - Machine Learning Algorithms