Metrics for Probabilistic Geometries

Alessandra Tosi, Søren Hauberg, Alfredo Vellido, Neil D. Lawrence

UAI 2014 pp. 800-808

/uai/2014/tosi2014uai-metrics/

Abstract

We investigate the geometrical structure of probabilistic generative dimensionality reduction models using the tools of Riemannian geometry. We explicitly define a distribution over the natural metric given by the models. We provide the necessary algorithms to compute expected metric tensors where the distribution over mappings is given by a Gaussian process. We treat the corresponding latent variable model as a Riemannian manifold and we use the expectation of the metric under the Gaussian process prior to define interpolating paths and measure distance between latent points. We show how distances that respect the expected metric lead to more appropriate generation of new data.

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Cite

Text

Tosi et al. "Metrics for Probabilistic Geometries." Conference on Uncertainty in Artificial Intelligence, 2014.

Markdown

[Tosi et al. "Metrics for Probabilistic Geometries." Conference on Uncertainty in Artificial Intelligence, 2014.](https://mlanthology.org/uai/2014/tosi2014uai-metrics/)

BibTeX

@inproceedings{tosi2014uai-metrics,
  title     = {{Metrics for Probabilistic Geometries}},
  author    = {Tosi, Alessandra and Hauberg, Søren and Vellido, Alfredo and Lawrence, Neil D.},
  booktitle = {Conference on Uncertainty in Artificial Intelligence},
  year      = {2014},
  pages     = {800-808},
  url       = {https://mlanthology.org/uai/2014/tosi2014uai-metrics/}
}