%0 Journal Article %A Mathelin, Lionel %D 2014 %I Begell House %K uncertainty quantification, least angle regression, high-dimensional model reduction, total least squares, alternate least squares, polynomial chaos %N 3 %P 243-271 %R 10.1615/Int.J.UncertaintyQuantification.2014008084 %T QUANTIFICATION OF UNCERTAINTY FROM HIGH-DIMENSIONAL SCATTERED DATA VIA POLYNOMIAL APPROXIMATION %U https://www.dl.begellhouse.com/journals/52034eb04b657aea,348c4184660ca52f,1705e44e62934820.html %V 4 %X This paper discusses a methodology for determining a functional representation of a random process from a collection of scattered pointwise samples. The present work specifically focuses onto random quantities lying in a high-dimensional stochastic space in the context of limited amount of information. The proposed approach involves a procedure for the selection of an approximation basis and the evaluation of the associated coefficients. The selection of the approximation basis relies on the a priori choice of the high-dimensional model representation format combined with a modified least angle regression technique. The resulting basis then provides the structure for the actual approximation basis, possibly using different functions, more parsimonious and nonlinear in its coefficients. To evaluate the coefficients, both an alternate least squares and an alternate weighted total least squares methods are employed. Examples are provided for the approximation of a random variable in a high-dimensional space as well as the estimation of a random field. Stochastic dimensions up to 100 are considered, with an amount of information as low as about 3 samples per dimension, and robustness of the approximation is demonstrated with respect to noise in the dataset. The computational cost of the solution method is shown to scale only linearly with the cardinality of the a priori basis and exhibits a (Nq)s, 2 ≤ s ≤ 3, dependence with the number Nq of samples in the dataset. The provided numerical experiments illustrate the ability of the present approach to derive an accurate approximation from scarce scattered data even in the presence of noise. %8 2014-05-20