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Autore principale: Lamboni, Matieyendou
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2503.12151
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author Lamboni, Matieyendou
author_facet Lamboni, Matieyendou
contents This paper proposes new ANOVA-based approximations of functions and emulators of high-dimensional models using either available derivatives or local stochastic evaluations of such models. Our approach makes use of sensitivity indices to design adequate structures of emulators. For high-dimensional models with available derivatives, our derivative-based emulators reach dimension-free mean squared errors (MSEs) and parametric rate of convergence (i.e., $\mathsf{O}(N^{-1})$). This approach is extended to cope with every model (without available derivatives) by deriving global emulators that account for the local properties of models or simulators. Such generic emulators enjoy dimension-free biases, parametric rates of convergence and MSEs that depend on the dimensionality. Dimension-free MSEs are obtained for high-dimensional models with particular inputs' distributions. Our emulators are also competitive in dealing with different distributions of the input variables and for selecting inputs and interactions. Simulations show the efficiency of our approach.
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id arxiv_https___arxiv_org_abs_2503_12151
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Optimal ANOVA-based emulators of models with(out) derivatives
Lamboni, Matieyendou
Statistics Theory
62J10, 62L20, 62Fxx, 49Q12, 26D10
This paper proposes new ANOVA-based approximations of functions and emulators of high-dimensional models using either available derivatives or local stochastic evaluations of such models. Our approach makes use of sensitivity indices to design adequate structures of emulators. For high-dimensional models with available derivatives, our derivative-based emulators reach dimension-free mean squared errors (MSEs) and parametric rate of convergence (i.e., $\mathsf{O}(N^{-1})$). This approach is extended to cope with every model (without available derivatives) by deriving global emulators that account for the local properties of models or simulators. Such generic emulators enjoy dimension-free biases, parametric rates of convergence and MSEs that depend on the dimensionality. Dimension-free MSEs are obtained for high-dimensional models with particular inputs' distributions. Our emulators are also competitive in dealing with different distributions of the input variables and for selecting inputs and interactions. Simulations show the efficiency of our approach.
title Optimal ANOVA-based emulators of models with(out) derivatives
topic Statistics Theory
62J10, 62L20, 62Fxx, 49Q12, 26D10
url https://arxiv.org/abs/2503.12151