Add to ORKGInternational audiencePolynomial chaos expansions (PCE) are widely used in the framework of uncertainty quantification. However, when dealing with high dimensional complex problems, challenging issues need to be faced. For instance, high-order polynomials may be required, which leads to a large polynomial basis whereas usually only a few of the basis functions are in fact significant. Taking into account the sparse structure of the model, advanced techniques such as sparse PCE (SPCE), have been recently proposed to alleviate the computational issue. In this paper, we propose a novel approach to SPCE, which allows one to exploit the model's hierarchical structure. The proposed approach is based on the adaptive enrichment of the polynomial ba...
Performing uncertainty quantification for engineering systems typically requires a large number of e...
This paper presents an algorithm for efficient uncertainty quantification (UQ) in the presence of ma...
International audienceThis paper is a state-of-the art review on sparse polynomial chaos expansions ...
Sparse polynomial chaos expansions (PCE) are an efficient and widely used surrogate modeling method ...
International audienceThe sparse polynomial chaos expansion (SPCE) methodology is an efficient appro...
In this paper we present a basis selection method that can be used with `1-minimization to adaptivel...
Abstract. Polynomial chaos expansions have proven powerful for emulating responses of com-putational...
Sparse polynomial chaos expansions (PCE) are a popular surrogate modelling method that takes advanta...
International audienceThe sparse polynomial chaos expansion (SPCE) methodology is an efficient appro...
Uncertainty is a common feature in first-principles models that are widely used in various engineeri...
Uncertainty exists widely in engineering design. As one of the key components of engineering design,...
Uncertainty quantification is an emerging research area aiming at quantifying the variation in engin...
Uncertainty quantification (UQ) is an emerging research area that aims to develop methods for accura...
<p>Polynomial chaos expansions provide an efficient and robust framework to analyze and quantify unc...
Polynomial chaos expansions (PCE) are an attractive technique for uncertainty quan-tification (UQ) d...
Performing uncertainty quantification for engineering systems typically requires a large number of e...
This paper presents an algorithm for efficient uncertainty quantification (UQ) in the presence of ma...
International audienceThis paper is a state-of-the art review on sparse polynomial chaos expansions ...
Sparse polynomial chaos expansions (PCE) are an efficient and widely used surrogate modeling method ...
International audienceThe sparse polynomial chaos expansion (SPCE) methodology is an efficient appro...
In this paper we present a basis selection method that can be used with `1-minimization to adaptivel...
Abstract. Polynomial chaos expansions have proven powerful for emulating responses of com-putational...
Sparse polynomial chaos expansions (PCE) are a popular surrogate modelling method that takes advanta...
International audienceThe sparse polynomial chaos expansion (SPCE) methodology is an efficient appro...
Uncertainty is a common feature in first-principles models that are widely used in various engineeri...
Uncertainty exists widely in engineering design. As one of the key components of engineering design,...
Uncertainty quantification is an emerging research area aiming at quantifying the variation in engin...
Uncertainty quantification (UQ) is an emerging research area that aims to develop methods for accura...
<p>Polynomial chaos expansions provide an efficient and robust framework to analyze and quantify unc...
Polynomial chaos expansions (PCE) are an attractive technique for uncertainty quan-tification (UQ) d...
Performing uncertainty quantification for engineering systems typically requires a large number of e...
This paper presents an algorithm for efficient uncertainty quantification (UQ) in the presence of ma...
International audienceThis paper is a state-of-the art review on sparse polynomial chaos expansions ...