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Iterative estimation of Sobol’ indices based on replicated designs

Laurent Gilquin 1, 2 Clémentine Prieur 1, 2, * Elise Arnaud 2 Herve Monod 3, 1
* Corresponding author
2 AIRSEA - Mathematics and computing applied to oceanic and atmospheric flows
Inria Grenoble - Rhône-Alpes, UGA - Université Grenoble Alpes, LJK - Laboratoire Jean Kuntzmann, Grenoble INP - Institut polytechnique de Grenoble - Grenoble Institute of Technology
Abstract : In the field of sensitivity analysis, Sobol’ indices are widely used to assess the importance of the inputs of a model to its output. Among the methods that estimate these indices, the replication procedure is noteworthy for its efficient cost. A practical problem is how many model evaluations must be performed to guarantee a sufficient precision on the Sobol’ estimates. The present paper tackles this issue by rendering the replication procedure iterative. The idea is to enable the addition of new model evaluations to progressively increase the accuracy of the estimates. These evaluations are done at points located in under-explored regions of the experimental designs, but preserving their characteristics. The key feature of this approach is the construction of nested space-filling designs. For the estimation of first-order indices, a nested Latin hypercube design is used. For the estimation of closed second-order indices, two constructions of a nested orthogonal array design are proposed. Regularity and uniformity properties of the nested designs are studied.
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Submitted on : Wednesday, February 10, 2021 - 1:49:50 PM
Last modification on : Thursday, July 8, 2021 - 3:52:46 AM

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Laurent Gilquin, Clémentine Prieur, Elise Arnaud, Herve Monod. Iterative estimation of Sobol’ indices based on replicated designs. Computational and Applied Mathematics, Springer Verlag, 2021, 40 (18), ⟨10.1007/s40314-020-01402-5⟩. ⟨hal-01291769v5⟩

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