This paper proposes a new deterministic sampling strategy for constructing polynomial chaos approximations for expensive physics simulation models. The proposed approach, effectively subsampled quadratures, involves sparsely subsampling an existing tensor grid using QR column pivoting. For polynomial interpolation using hyperbolic or total order sets, we then solve the following square least squares problem. For polynomial approximation, we use a column pruning heuristic that removes columns based on the highest total orders and then solves the tall least squares problem. While we provide bounds on the condition number of such tall submatrices, it is difficult to ascertain how column pruning affects solution accuracy as this is problem spec...
In this paper we present a basis selection method that can be used with `1-minimization to adaptivel...
International audienceComputer simulation has become the standard tool in many engineering fields fo...
International audienceWe consider the problem of Lagrange polynomial interpolation in high or counta...
Weighted least squares polynomial approximation uses random samples to determine projections of func...
Abstract. Polynomial chaos expansions have proven powerful for emulating responses of com-putational...
Finding suitable points for multivariate polynomial interpolation and approximation is a challenging...
Given a finite set of points X in R^n, one may ask for polynomials p which belong to a subspace V an...
Sparse polynomial chaos expansions (PCE) are a popular surrogate modelling method that takes advanta...
Abstract. Metamodelling decreases the computational effort of time-consuming computer simulations by...
Uncertainty quantification (UQ) is an emerging research area that aims to develop methods for accura...
Non-intrusive Polynomial Chaos (NIPC) methods have become popular for uncertainty quantification, as...
A new arbitrary Polynomial Chaos (aPC) method is presented for moderately high-dimensional problems ...
In this article, multi-fidelity kriging and sparse polynomial chaos expansion (SPCE) surrogate model...
In the context of uncertainty propagation, the variation range of random variables may be many oder ...
In surrogate modeling, polynomial chaos expansion (PCE) is popularly utilized to represent the rando...
In this paper we present a basis selection method that can be used with `1-minimization to adaptivel...
International audienceComputer simulation has become the standard tool in many engineering fields fo...
International audienceWe consider the problem of Lagrange polynomial interpolation in high or counta...
Weighted least squares polynomial approximation uses random samples to determine projections of func...
Abstract. Polynomial chaos expansions have proven powerful for emulating responses of com-putational...
Finding suitable points for multivariate polynomial interpolation and approximation is a challenging...
Given a finite set of points X in R^n, one may ask for polynomials p which belong to a subspace V an...
Sparse polynomial chaos expansions (PCE) are a popular surrogate modelling method that takes advanta...
Abstract. Metamodelling decreases the computational effort of time-consuming computer simulations by...
Uncertainty quantification (UQ) is an emerging research area that aims to develop methods for accura...
Non-intrusive Polynomial Chaos (NIPC) methods have become popular for uncertainty quantification, as...
A new arbitrary Polynomial Chaos (aPC) method is presented for moderately high-dimensional problems ...
In this article, multi-fidelity kriging and sparse polynomial chaos expansion (SPCE) surrogate model...
In the context of uncertainty propagation, the variation range of random variables may be many oder ...
In surrogate modeling, polynomial chaos expansion (PCE) is popularly utilized to represent the rando...
In this paper we present a basis selection method that can be used with `1-minimization to adaptivel...
International audienceComputer simulation has become the standard tool in many engineering fields fo...
International audienceWe consider the problem of Lagrange polynomial interpolation in high or counta...