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A SURVEY OF CONSTRAINED GAUSSIAN PROCESS REGRESSION: APPROACHES AND IMPLEMENTATION CHALLENGES

Laura P. Swiler, Mamikon Gulian, Ari L. Frankel, Cosmin Safta, John D. Jakeman

2020Journal of Machine Learning for Modeling and Computing152 citationsDOIOpen Access PDF

Abstract

Gaussian process regression is a popular Bayesian framework for surrogate modeling of expensive data sources. As part of a broader effort in scientific machine learning, many recent works have incorporated physical constraints or other a priori information within Gaussian process regression to supplement limited data and regularize the behavior of the model. We provide an overview and survey of several classes of Gaussian process constraints, including positivity or bound constraints, monotonicity and convexity constraints, differential equation constraints provided by linear PDEs, and boundary condition constraints. We compare the strategies behind each approach as well as the differences in implementation, concluding with a discussion of the computational challenges introduced by constraints.

Topics & Concepts

Gaussian processConvexityA priori and a posterioriComputer scienceProcess (computing)KrigingMonotonic functionMathematical optimizationBayesian probabilityRegressionGaussianMachine learningRegression analysisBoundary (topology)MathematicsLinear regressionArtificial intelligenceData miningData pointAlgorithmDifferential equationApplied mathematicsVariance (accounting)Bayesian inferenceGaussian random fieldWork in processGaussian Processes and Bayesian InferenceAdvanced Multi-Objective Optimization AlgorithmsMachine Learning in Materials Science