In this work we address the problem of performing uncertainty and sensitivity analysis of complex physical systems where classical Monte-Carlo methods are too expensive to be applied due to the high computational complexity. We consider the Polynomial Chaos Expansion (PCE) as an efficient way of computing a response surface for a model of gas injection into an incompressible porous media aiming at assessing the sensitivity indices and the main distributional features of the maximal spread of the gas cloud. The necessity of an uncertainty study for such a model arises in case of CO2 storage risk assessment and is here performed by jointly using a numerical scheme to solve the system of partial differential equation (PDE) governing the model ...
In light of worsening climate change and an increased interest in adapting infrastructure to cope wi...
In this work, we show how the use of Global Sensitivity Analysis (GSA) in conjunction with the Polyn...
Reservoir simulations involve a large number of formation and fluid parameters, many of which are su...
In this work we address the problem of performing uncertainty and sensitivity analysis of complex ph...
International audienceIn this work we address the problem of performing uncertainty and sensitivity ...
Uncertainty Quantification (UQ) of numerical simulations is highly relevant in the study and design ...
We consider time-average quantities of chaotic systems and their sensitivity to system parameters. W...
In this paper, surrogate models are iteratively built using polynomial chaos expansion (PCE) and det...
Uncertainty is a common feature in first-principles models that are widely used in various engineeri...
This thesis takes place in the context of uncertainty propagation and sensitivity analysis of comput...
La gestion des transferts des contaminants en milieu poreux représentent une préoccupation croissant...
This paper deals with the analysis of the dynamic behavior of nonlinear systems subject to probabili...
Uncertainty quantification seeks to provide a quantitative means to understand complex systems that ...
In light of worsening climate change and an increased interest in adapting infrastructure to cope wi...
In this work, we show how the use of Global Sensitivity Analysis (GSA) in conjunction with the Polyn...
Reservoir simulations involve a large number of formation and fluid parameters, many of which are su...
In this work we address the problem of performing uncertainty and sensitivity analysis of complex ph...
International audienceIn this work we address the problem of performing uncertainty and sensitivity ...
Uncertainty Quantification (UQ) of numerical simulations is highly relevant in the study and design ...
We consider time-average quantities of chaotic systems and their sensitivity to system parameters. W...
In this paper, surrogate models are iteratively built using polynomial chaos expansion (PCE) and det...
Uncertainty is a common feature in first-principles models that are widely used in various engineeri...
This thesis takes place in the context of uncertainty propagation and sensitivity analysis of comput...
La gestion des transferts des contaminants en milieu poreux représentent une préoccupation croissant...
This paper deals with the analysis of the dynamic behavior of nonlinear systems subject to probabili...
Uncertainty quantification seeks to provide a quantitative means to understand complex systems that ...
In light of worsening climate change and an increased interest in adapting infrastructure to cope wi...
In this work, we show how the use of Global Sensitivity Analysis (GSA) in conjunction with the Polyn...
Reservoir simulations involve a large number of formation and fluid parameters, many of which are su...