The Multivariate Generalised von Mises Distribution: Inference and Applications

Authors

  • Alexandre Navarro University of Cambridge
  • Jes Frellsen University of Cambridge
  • Richard Turner University of Cambridge

DOI:

https://doi.org/10.1609/aaai.v31i1.10943

Keywords:

Circular statistics, Bayesian inference, Approximate inference, Kernels, Gaussian Processes

Abstract

Circular variables arise in a multitude of data-modelling contexts ranging from robotics to the social sciences, but they have been largely overlooked by the machine learning community. This paper partially redresses this imbalance by extending some standard probabilistic modelling tools to the circular domain. First we introduce a new multivariate distribution over circular variables, called the multivariate Generalised von Mises (mGvM) distribution. This distribution can be constructed by restricting and renormalising a general multivariate Gaussian distribution to the unit hyper-torus. Previously proposed multivariate circular distributions are shown to be special cases of this construction. Second, we introduce a new probabilistic model for circular regression inspired by Gaussian Processes, and a method for probabilistic Principal Component Analysis with circular hidden variables. These models can leverage standard modelling tools (e.g. kernel functions and automatic relevance determination). Third, we show that the posterior distribution in these models is a mGvM distribution which enables development of an efficient variational free-energy scheme for performing approximate inference and approximate maximum-likelihood learning.

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Published

2017-02-13

How to Cite

Navarro, A., Frellsen, J., & Turner, R. (2017). The Multivariate Generalised von Mises Distribution: Inference and Applications. Proceedings of the AAAI Conference on Artificial Intelligence, 31(1). https://doi.org/10.1609/aaai.v31i1.10943