Multi-fidelity Gaussian process regression for computer experiments

Abstract : This work is on Gaussian-process based approximation of a code which can be run at different levels of accuracy. The goal is to improve the predictions of a surrogate model of a complex computer code using fast approximations of it. A new formulation of a co-kriging based method has been proposed. In particular this formulation allows for fast implementation and for closed-form expressions for the predictive mean and variance for universal co-kriging in the multi-fidelity framework, which is a breakthrough as it really allows for the practical application of such a method in real cases. Furthermore, fast cross validation, sequential experimental design and sensitivity analysis methods have been extended to the multi-fidelity co-kriging framework. This thesis also deals with a conjecture about the dependence of the learning curve (ie the decay rate of the mean square error) with respect to the smoothness of the underlying function. A proof in a fairly general situation (which includes the classical models of Gaussian-process based metamodels with stationary covariance functions) has been obtained while the previous proofs hold only for degenerate kernels (ie when the process is in fact finite-dimensional). This result allows for addressing rigorously practical questions such as the optimal allocation of the budget between different levels of codes in the multi-fidelity framework.
Document type :
Autres [stat.ML]. Université Paris-Diderot - Paris VII, 2013. Français
Liste complète des métadonnées

Cited literature [177 references]  Display  Hide  Download
Contributor : Loic Le Gratiet <>
Submitted on : Friday, October 11, 2013 - 2:54:46 PM
Last modification on : Wednesday, March 21, 2018 - 6:56:49 PM
Document(s) archivé(s) le : Friday, April 7, 2017 - 9:54:44 AM


  • HAL Id : tel-00866770, version 2




Loic Le Gratiet. Multi-fidelity Gaussian process regression for computer experiments. Autres [stat.ML]. Université Paris-Diderot - Paris VII, 2013. Français. 〈tel-00866770v2〉



Record views


Files downloads