Towards Unifying Hamiltonian Monte Carlo and Slice Sampling

Yizhe Zhang, Xiangyu Wang, Changyou Chen, Ricardo Henao, Kai Fan, Lawrence Carin

NeurIPS 2016 pp. 1741-1749

/neurips/2016/zhang2016neurips-unifying/

Abstract

We unify slice sampling and Hamiltonian Monte Carlo (HMC) sampling, demonstrating their connection via the Hamiltonian-Jacobi equation from Hamiltonian mechanics. This insight enables extension of HMC and slice sampling to a broader family of samplers, called Monomial Gamma Samplers (MGS). We provide a theoretical analysis of the mixing performance of such samplers, proving that in the limit of a single parameter, the MGS draws decorrelated samples from the desired target distribution. We further show that as this parameter tends toward this limit, performance gains are achieved at a cost of increasing numerical difficulty and some practical convergence issues. Our theoretical results are validated with synthetic data and real-world applications.

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Cite

Text

Zhang et al. "Towards Unifying Hamiltonian Monte Carlo and Slice Sampling." Neural Information Processing Systems, 2016.

Markdown

[Zhang et al. "Towards Unifying Hamiltonian Monte Carlo and Slice Sampling." Neural Information Processing Systems, 2016.](https://mlanthology.org/neurips/2016/zhang2016neurips-unifying/)

BibTeX

@inproceedings{zhang2016neurips-unifying,
  title     = {{Towards Unifying Hamiltonian Monte Carlo and Slice Sampling}},
  author    = {Zhang, Yizhe and Wang, Xiangyu and Chen, Changyou and Henao, Ricardo and Fan, Kai and Carin, Lawrence},
  booktitle = {Neural Information Processing Systems},
  year      = {2016},
  pages     = {1741-1749},
  url       = {https://mlanthology.org/neurips/2016/zhang2016neurips-unifying/}
}