Conference paper
A locally adaptive normal distribution
The multivariate normal density is a monotonic function of the distance to the mean, and its ellipsoidal shape is due to the underlying Euclidean metric. We suggest to replace this metric with a locally adaptive, smoothly changing (Riemannian) metric that favors regions of high local density. The resulting locally adaptive normal distribution (LAND) is a generalization of the normal distribution to the "manifold" setting, where data is assumed to lie near a potentially low-dimensional manifold embedded in RD.
The LAND is parametric, depending only on a mean and a covariance, and is the maximum entropy distribution under the given metric. The underlying metric is, however, non-parametric. We develop a maximum likelihood algorithm to infer the distribution parameters that relies on a combination of gradient descent and Monte Carlo integration.
We further extend the LAND to mixture models, and provide the corresponding EM algorithm. We demonstrate the efficiency of the LAND to fit non-trivial probability distributions over both synthetic data, and EEG measurements of human sleep.
| Language: | English |
|---|---|
| Year: | 2016 |
| Pages: | 4258-4266 |
| Proceedings: | 30th Annual Conference on Neural Information Processing Systems |
| ISSN: | 10495258 |
| Types: | Conference paper |
| ORCIDs: | Hansen, Lars Kai and Hauberg, Søren |
Computer Networks and Communications Distribution parameters Euclidean metrics Information Systems Low-dimensional manifolds Maximum entropy distribution Maximum likelihood Maximum likelihood algorithm Monotonic functions Monte Carlo integration Multivariate normal Normal distribution Probability distributions Signal Processing
