This work provides a review on reduced order methods in solving uncertainty quantification problems. A quick introduction of the reduced order methods, including proper orthogonal decomposition and greedy reduced basis methods, are presented along with the essential components of general greedy algorithm, a posteriori error estimation and Offline-Online decomposition. More advanced reduced order methods are then developed for solving typical uncertainty quantification problems involving pointwise evaluation and/or statistical integration, such as failure probability evaluation, Bayesian inverse problems and variational data assimilation. Three expository examples are provided to demonstrate the efficiency and accuracy of the reduced order m...
The field of uncertainty quantification is evolving rapidly because of increasing emphasis on models...
In a Bayesian setting, inverse problems and uncertainty quantification (UQ)— the propagation of unce...
This paper builds on work by Haylock and O'Hagan which developed a Bayesian approach to uncerta...
In this work we review a reduced basis method for the solution of uncertainty quantification problem...
The main contributions of the present thesis are novel computational methods related to uncertainty ...
The development of computational algorithms for solving inverse problems is, and has been, a primary...
International audienceThe Reduced-Basis Control-Variate Monte-Carlo method was introduced recently i...
Computational inverse problems related to partial differential equations (PDEs) often contain nuisan...
The Reduced-Basis Control-Variate Monte-Carlo method was introduced recently in [S. Boyaval and T. L...
This work proposes a Bayesian inference method for the reduced-order modeling of time-dependent syst...
Expert judgment is frequently used to assess parameter values of quantitative management science mod...
We computationally investigate two approaches for uncertainty quantification in inverse problems for...
Modeling and Inverse Problems in the Presence of Uncertainty collects recent research-including the ...
Computational inverse problems related to partial differential equations (PDEs) often contain nuisan...
Computer codes simulating physical systems usually have responses that consist of a set of distinct ...
The field of uncertainty quantification is evolving rapidly because of increasing emphasis on models...
In a Bayesian setting, inverse problems and uncertainty quantification (UQ)— the propagation of unce...
This paper builds on work by Haylock and O'Hagan which developed a Bayesian approach to uncerta...
In this work we review a reduced basis method for the solution of uncertainty quantification problem...
The main contributions of the present thesis are novel computational methods related to uncertainty ...
The development of computational algorithms for solving inverse problems is, and has been, a primary...
International audienceThe Reduced-Basis Control-Variate Monte-Carlo method was introduced recently i...
Computational inverse problems related to partial differential equations (PDEs) often contain nuisan...
The Reduced-Basis Control-Variate Monte-Carlo method was introduced recently in [S. Boyaval and T. L...
This work proposes a Bayesian inference method for the reduced-order modeling of time-dependent syst...
Expert judgment is frequently used to assess parameter values of quantitative management science mod...
We computationally investigate two approaches for uncertainty quantification in inverse problems for...
Modeling and Inverse Problems in the Presence of Uncertainty collects recent research-including the ...
Computational inverse problems related to partial differential equations (PDEs) often contain nuisan...
Computer codes simulating physical systems usually have responses that consist of a set of distinct ...
The field of uncertainty quantification is evolving rapidly because of increasing emphasis on models...
In a Bayesian setting, inverse problems and uncertainty quantification (UQ)— the propagation of unce...
This paper builds on work by Haylock and O'Hagan which developed a Bayesian approach to uncerta...