Uncertainty Quantification for Approximate p-Quantiles for Physical Models with Stochastic Inputs
Artikel i vetenskaplig tidskrift, 2014

We consider the problem of estimating the p-quantile for a given functional evaluated on solutions of a deterministic model in which model input is subject to stochastic variation. We derive upper and lower bounding estimators of the p-quantile. We perform an a posteriori error analysis for the p-quantile estimators that takes into account the effects of both the stochastic sampling error and the deterministic numerical solution error and yields a computational error bound for the estimators. We also analyze the asymptotic convergence properties of the p-quantile estimator bounds in the limit of large sample size and decreasing numerical error and describe algorithms for computing an estimator of the p-quantile with a desired accuracy in a computationally efficient fashion. One algorithm exploits the fact that the accuracy of only a subset of sample values significantly affects the accuracy of a p-quantile estimator resulting in a significant gain in computational efficiency. We conclude with a number of numerical examples, including an application to Darcy flow in porous media.

Författare

Daniel Elfverson

Donald J. Estep

F. Hellman

Axel Målqvist

Chalmers, Matematiska vetenskaper, Matematik

Göteborgs universitet

SIAM-ASA Journal on Uncertainty Quantification

21662525 (eISSN)

Vol. 2 1 826-850

Ämneskategorier

Matematik

DOI

10.1137/140967039

Mer information

Senast uppdaterat

2024-01-03