Mixtures of Gaussian Processes for regression under multiple prior distributions
When constructing a Bayesian Machine Learning model, we might be faced with multiple different prior distributions and thus are required to properly consider them in a sensible manner in our model. While this situation is reasonably well explored for classical Bayesian Statistics, it appears useful to develop a corresponding method for complex Machine Learning problems. Given their underlying Bayesian framework and their widespread popularity, Gaussian Processes are a good candidate to tackle this task. We therefore extend the idea of Mixture models for Gaussian Process regression in order to work with multiple prior beliefs at once - both a analytical regression formula and a Sparse Variational approach are considered. In addition, we consider the usage of our approach to additionally account for the problem of prior misspecification in functional regression problems.
Apr-19-2021
- Country:
- Oceania > Australia
- Australian Capital Territory > Canberra (0.04)
- North America
- United States
- Washington > King County
- Bellevue (0.04)
- Georgia > Fulton County
- Atlanta (0.04)
- Colorado > Denver County
- Denver (0.04)
- California
- San Diego County > San Diego (0.04)
- Monterey County > Seaside (0.04)
- Washington > King County
- Canada > British Columbia
- United States
- Europe
- Italy > Sicily
- Palermo (0.04)
- Germany > Baden-Württemberg
- Tübingen Region > Tübingen (0.04)
- Italy > Sicily
- Asia > Middle East
- Oceania > Australia
- Genre:
- Research Report (0.50)
- Industry:
- Education (0.48)