This book presents applications of spectral methods to problems of uncertainty propagation and quantification in model-based computations, focusing on the computational and algorithmic features of these methods most useful in dealing with models based on partial differential equations, in particular models arising in simulations of fluid flows. Spectral stochastic methods are probabilistic in nature, and are consequently rooted in the rich mathematical foundations associated with probability and measure spaces. A brief discussion is provided of only those theoretical aspects needed to set the stage for subsequent applications. These are demonstrated through detailed treatments of elementary problems, as well as in more elaborate examples in...
This thesis presents a reliable and efficient algorithm for combined model uncertainty and discretiz...
In this thesis we study partial differential equations with random inputs. The effects that differen...
International audienceThis paper deals with spectral stochastic methods for uncertainty propagation ...
The objectives of this project were: (1) Develop a general algorithmic framework for stochastic ordi...
This paper describes a fully spectral, Polynomial Chaos method for the propagation of uncertainty in...
International audienceUncertainty quantification appears today as a crucial point in numerous branch...
Uncertainty quantification techniques based on the spectral approach have been studied extensively i...
The flow-driven spectral chaos (FSC) is a recently developed method for tracking and quantifying unc...
Due to rising computing capacities, including and accounting for uncertain (model) parameters in num...
To reduce the computational cost of the uncertainty propagation analysis, which is used to study the...
This thesis presents the development and the implementation of an uncertainty propagation algorithm ...
To accurately predict the performance of physical systems, it becomes essential for one to include t...
In the last few decades, enormous progress has been made in the field of Computational Fluid Dynamic...
This thesis has investigated the field of Uncertainty Quantification with regard to differential equ...
Uncertainty quantication (UQ) in CFD computations is receiving increased in-terest, due in large par...
This thesis presents a reliable and efficient algorithm for combined model uncertainty and discretiz...
In this thesis we study partial differential equations with random inputs. The effects that differen...
International audienceThis paper deals with spectral stochastic methods for uncertainty propagation ...
The objectives of this project were: (1) Develop a general algorithmic framework for stochastic ordi...
This paper describes a fully spectral, Polynomial Chaos method for the propagation of uncertainty in...
International audienceUncertainty quantification appears today as a crucial point in numerous branch...
Uncertainty quantification techniques based on the spectral approach have been studied extensively i...
The flow-driven spectral chaos (FSC) is a recently developed method for tracking and quantifying unc...
Due to rising computing capacities, including and accounting for uncertain (model) parameters in num...
To reduce the computational cost of the uncertainty propagation analysis, which is used to study the...
This thesis presents the development and the implementation of an uncertainty propagation algorithm ...
To accurately predict the performance of physical systems, it becomes essential for one to include t...
In the last few decades, enormous progress has been made in the field of Computational Fluid Dynamic...
This thesis has investigated the field of Uncertainty Quantification with regard to differential equ...
Uncertainty quantication (UQ) in CFD computations is receiving increased in-terest, due in large par...
This thesis presents a reliable and efficient algorithm for combined model uncertainty and discretiz...
In this thesis we study partial differential equations with random inputs. The effects that differen...
International audienceThis paper deals with spectral stochastic methods for uncertainty propagation ...