We present a simple and robust strategy for the selection of sampling points in uncertainty quantification. The goal is to achieve the fastest possible convergence in the cumulative distribution function of a stochastic output of interest. We assume that the output of interest is the outcome of a computationally expensive nonlinear mapping of an input random variable, whose probability density function is known. We use a radial function basis to construct an accurate interpolant of the mapping. This strategy enables adding new sampling points one at a time, adaptively. This takes into full account the previous evaluations of the target nonlinear function. We present comparisons with a stochastic collocation method based on the Clenshaw-Curt...
Monte Carlo analysis has become nearly ubiquitous since its introduction, now over 65 years ago. It ...
In this article, we propose the use of partitioning and clustering methods as an alternative to Gau...
Fixed point iteration is a common strategy to handle interdisciplinary coupling within a coupled mul...
We present a simple and robust strategy for the selection of sampling points in uncertainty quantifi...
This dissertation investigates the use of sampling methods for solving stochastic optimization probl...
Most physical systems are inevitably affected by uncertainties due to natural variabili-ties or inco...
In non-linear estimations, it is common to assess sampling uncertainty by bootstrap inference. For c...
In this paper we present a stochastic collocation method for quantifying uncertainty in models with ...
In this article, we propose the use of partitioning and clustering methods as an alternative to Gaus...
The accuracy and the computational efficiency of a Point-Collocation Non-Intrusive Polynomial Chaos ...
textabstractUncertainty Quantification is the field of mathematics that focuses on the propagation a...
We consider Uncertainty Quanti¿cation (UQ) by expanding the solution in so-called generalized Polyno...
An approach for robust design based on stochastic expansions is investigated. The research consists...
This book presents the details of the BONUS algorithm and its real world applications in areas like ...
The field of uncertainty quantification (UQ) deals with physical systems described by an input-outpu...
Monte Carlo analysis has become nearly ubiquitous since its introduction, now over 65 years ago. It ...
In this article, we propose the use of partitioning and clustering methods as an alternative to Gau...
Fixed point iteration is a common strategy to handle interdisciplinary coupling within a coupled mul...
We present a simple and robust strategy for the selection of sampling points in uncertainty quantifi...
This dissertation investigates the use of sampling methods for solving stochastic optimization probl...
Most physical systems are inevitably affected by uncertainties due to natural variabili-ties or inco...
In non-linear estimations, it is common to assess sampling uncertainty by bootstrap inference. For c...
In this paper we present a stochastic collocation method for quantifying uncertainty in models with ...
In this article, we propose the use of partitioning and clustering methods as an alternative to Gaus...
The accuracy and the computational efficiency of a Point-Collocation Non-Intrusive Polynomial Chaos ...
textabstractUncertainty Quantification is the field of mathematics that focuses on the propagation a...
We consider Uncertainty Quanti¿cation (UQ) by expanding the solution in so-called generalized Polyno...
An approach for robust design based on stochastic expansions is investigated. The research consists...
This book presents the details of the BONUS algorithm and its real world applications in areas like ...
The field of uncertainty quantification (UQ) deals with physical systems described by an input-outpu...
Monte Carlo analysis has become nearly ubiquitous since its introduction, now over 65 years ago. It ...
In this article, we propose the use of partitioning and clustering methods as an alternative to Gau...
Fixed point iteration is a common strategy to handle interdisciplinary coupling within a coupled mul...