Generalized polynomial chaos (gPC) expansions allow us to represent the solution of a stochastic system using a series of polynomial chaos basis functions. The number of gPC terms increases dramatically as the dimension of the random input variables increases. When the number of the gPC terms is larger than that of the available samples, a scenario that often occurs when the corresponding deterministic solver is computationally expensive, evaluation of the gPC expansion can be inaccurate due to over-fitting. We propose a fully Bayesian approach that allows for global recovery of the stochastic solutions, in both spatial and random domains, by coupling Bayesian model uncertainty and regularization regression methods. It allows the evaluation...
In many fields, active research is currently focused on quantification and simulation of model uncer...
Modeling of physical systems in the presence of uncertainties is critical in many respects. Therefor...
Non-intrusive polynomial chaos expansion (PCE) and stochastic collocation (SC) meth-ods are attracti...
We propose a new fully Bayesian method to efficiently obtain the spectral representation of a spatia...
Most physical systems are inevitably affected by uncertainties due to natural variabili-ties or inco...
Uncertainty quantification seeks to provide a quantitative means to understand complex systems that ...
Uncertainty quantification (UQ) is an emerging research area that aims to develop methods for accura...
We propose a method for quantifying uncertainty in high-dimensional PDE systems with random paramete...
This paper is concerned with the characterization and the propagation of errors associated with data...
Uncertainty quantification is an emerging research area aiming at quantifying the variation in engin...
Global reliability sensitivity analysis determines the effects of input uncertain parameters on the ...
Abstract—A computationally efficient means for propaga-tion of uncertainty in computational models i...
Non-intrusive polynomial chaos expansion (PCE) and stochastic collocation (SC) meth-ods are attracti...
This paper presents a methodology to quantify computationally the uncertainty in a class of differen...
International audiencePolynomial chaos expansions are frequently used by engineers and modellers for...
In many fields, active research is currently focused on quantification and simulation of model uncer...
Modeling of physical systems in the presence of uncertainties is critical in many respects. Therefor...
Non-intrusive polynomial chaos expansion (PCE) and stochastic collocation (SC) meth-ods are attracti...
We propose a new fully Bayesian method to efficiently obtain the spectral representation of a spatia...
Most physical systems are inevitably affected by uncertainties due to natural variabili-ties or inco...
Uncertainty quantification seeks to provide a quantitative means to understand complex systems that ...
Uncertainty quantification (UQ) is an emerging research area that aims to develop methods for accura...
We propose a method for quantifying uncertainty in high-dimensional PDE systems with random paramete...
This paper is concerned with the characterization and the propagation of errors associated with data...
Uncertainty quantification is an emerging research area aiming at quantifying the variation in engin...
Global reliability sensitivity analysis determines the effects of input uncertain parameters on the ...
Abstract—A computationally efficient means for propaga-tion of uncertainty in computational models i...
Non-intrusive polynomial chaos expansion (PCE) and stochastic collocation (SC) meth-ods are attracti...
This paper presents a methodology to quantify computationally the uncertainty in a class of differen...
International audiencePolynomial chaos expansions are frequently used by engineers and modellers for...
In many fields, active research is currently focused on quantification and simulation of model uncer...
Modeling of physical systems in the presence of uncertainties is critical in many respects. Therefor...
Non-intrusive polynomial chaos expansion (PCE) and stochastic collocation (SC) meth-ods are attracti...