Gaussian Processes Regression for Uncertainty Quantification: An Introductory Tutorial

Gaussian Process Regression (GPR) is a powerful nonparametric regression method that is widely used in Uncertainty Quantification (UQ) for constructing surrogate models. This tutorial serves as an introductory guide for beginners, aiming to offer a structured and accessible overview of GPR's applications in UQ. We begin with an introduction to UQ and outline its key tasks, including uncertainty propagation, risk estimation, optimization under uncertainty, parameter estimation, and sensitivity analysis. We then introduce Gaussian Processes (GPs) as a surrogate modeling technique, detailing their formulation, choice of covariance kernels, hyperparameter estimation, and active learning strategies for efficient data acquisition. The tutorial further explores how GPR can be applied to different UQ tasks, including Bayesian quadrature for uncertainty propagation, active learning-based risk estimation, Bayesian optimization for optimization under uncertainty, and surrogate-based sensitivity analysis. Throughout, we emphasize how to leverage the unique formulation of GP for these UQ tasks, rather than simply using it as a standard surrogate model.