The so-called polynomial chaos expansion is widely used in computer experiments. For example, it is a powerful tool to estimate Sobol' sensitivity indices. In this paper, we consider generalized chaos expansions built on general tensor Hilbert basis. In this frame, we revisit the computation of the Sobol' indices and give general lower bounds for these indices. The case of the eigenfunctions system associated with a Poincaré differential operator leads to lower bounds involving the derivatives of the analyzed function and provides an efficient tool for variable screening. These lower bounds are put in action both on toy and real life models demonstrating their accuracy
International audienceUncertainty quantification in computational mechanics has received much attent...
We propose a thorough comparison of polynomial chaos expansion (PCE) for indicator functions of the ...
International audienceIn this paper, we discuss the sensitivity analysis of model response when the ...
The so-called polynomial chaos expansion is widely used in computer experiments. For example, it is ...
Variance-based global sensitivity analysis, and in particular Sobol' analysis, is widely adopted to ...
Variance-based global sensitivity analysis, in particular Sobol' analysis, is widely used for determ...
In the field of computer experiments sensitivity analysis aims at quantifying the relative importanc...
ABSTRACT: Global sensitivity analysis aims at quantifying the uncertainty of the output of a compute...
International audienceGlobal sensitivity analysis is now established as a powerful approach for dete...
International audienceThis paper deals with global sensitivity analysis of computer model output. Gi...
This paper deals with global sensitivity analysis of computer model output. Given an independent inp...
We use the Karhunen-Loève expansion of a random-field model to construct a tensorised Bayesian linea...
The estimation of variance-based importance measures (called Sobol' indices) of the input variables ...
Polynomial chaos expansions (PCE) meta-model has been wildly used and investigated in the last d...
The basic reproduction number, simply denoted by $R_0$, plays a fundamental role in the analysis of ...
International audienceUncertainty quantification in computational mechanics has received much attent...
We propose a thorough comparison of polynomial chaos expansion (PCE) for indicator functions of the ...
International audienceIn this paper, we discuss the sensitivity analysis of model response when the ...
The so-called polynomial chaos expansion is widely used in computer experiments. For example, it is ...
Variance-based global sensitivity analysis, and in particular Sobol' analysis, is widely adopted to ...
Variance-based global sensitivity analysis, in particular Sobol' analysis, is widely used for determ...
In the field of computer experiments sensitivity analysis aims at quantifying the relative importanc...
ABSTRACT: Global sensitivity analysis aims at quantifying the uncertainty of the output of a compute...
International audienceGlobal sensitivity analysis is now established as a powerful approach for dete...
International audienceThis paper deals with global sensitivity analysis of computer model output. Gi...
This paper deals with global sensitivity analysis of computer model output. Given an independent inp...
We use the Karhunen-Loève expansion of a random-field model to construct a tensorised Bayesian linea...
The estimation of variance-based importance measures (called Sobol' indices) of the input variables ...
Polynomial chaos expansions (PCE) meta-model has been wildly used and investigated in the last d...
The basic reproduction number, simply denoted by $R_0$, plays a fundamental role in the analysis of ...
International audienceUncertainty quantification in computational mechanics has received much attent...
We propose a thorough comparison of polynomial chaos expansion (PCE) for indicator functions of the ...
International audienceIn this paper, we discuss the sensitivity analysis of model response when the ...