We propose a method for quantifying uncertainty in high-dimensional PDE systems with random parameters, where the number of solution evaluations is small. Parametric PDE solutions are often approximated using a spectral decomposition based on polynomial chaos expansions. For the class of systems we consider (i.e., high dimensional with limited solution evaluations) the coefficients are given by an underdetermined linear system in a regression formulation. This implies additional assumptions, such as sparsity of the coefficient vector, are needed to approximate the solution. Here, we present an approach where we assume the coefficients are close to the range of a generative model that maps from a low to a high dimensional space of coefficien...
Constructing surrogate models for uncertainty quantification (UQ) on complex partial differential eq...
Abstract. In this paper we review some applications of generalized polynomial chaos expansion for un...
This work studies sparse reconstruction techniques for approximating solutions of high-dimensional p...
Generalized polynomial chaos (gPC) expansions allow us to represent the solution of a stochastic sys...
We propose a method for the approximation of solutions of PDEs with stochastic coefficients based on...
Uncertainty quantification (UQ) is an emerging research area that aims to develop methods for accura...
In this work, we consider the Biot problem with uncertain poroelastic coefficients. The uncertainty ...
In this thesis we analyse the approximation of countably-parametric functions $u$ and their expectat...
Uncertainty quantification techniques based on the spectral approach have been studied extensively i...
This paper presents a methodology to quantify computationally the uncertainty in a class of differen...
<p>Polynomial chaos expansions provide an efficient and robust framework to analyze and quantify unc...
Partial differential equations (PDEs) with random input data, such as random loadings and coefficien...
The important task of evaluating the impact of random parameters on the output of stochastic ordinar...
We present an enriched formulation of the Least Squares (LSQ) regression method for Uncertainty Quan...
Recent advances in the field of uncertainty quantification are based on achieving suitable functiona...
Constructing surrogate models for uncertainty quantification (UQ) on complex partial differential eq...
Abstract. In this paper we review some applications of generalized polynomial chaos expansion for un...
This work studies sparse reconstruction techniques for approximating solutions of high-dimensional p...
Generalized polynomial chaos (gPC) expansions allow us to represent the solution of a stochastic sys...
We propose a method for the approximation of solutions of PDEs with stochastic coefficients based on...
Uncertainty quantification (UQ) is an emerging research area that aims to develop methods for accura...
In this work, we consider the Biot problem with uncertain poroelastic coefficients. The uncertainty ...
In this thesis we analyse the approximation of countably-parametric functions $u$ and their expectat...
Uncertainty quantification techniques based on the spectral approach have been studied extensively i...
This paper presents a methodology to quantify computationally the uncertainty in a class of differen...
<p>Polynomial chaos expansions provide an efficient and robust framework to analyze and quantify unc...
Partial differential equations (PDEs) with random input data, such as random loadings and coefficien...
The important task of evaluating the impact of random parameters on the output of stochastic ordinar...
We present an enriched formulation of the Least Squares (LSQ) regression method for Uncertainty Quan...
Recent advances in the field of uncertainty quantification are based on achieving suitable functiona...
Constructing surrogate models for uncertainty quantification (UQ) on complex partial differential eq...
Abstract. In this paper we review some applications of generalized polynomial chaos expansion for un...
This work studies sparse reconstruction techniques for approximating solutions of high-dimensional p...