Add to ORKGIn the present article, we show that the multilevel Monte Carlo method for elliptic stochastic partial differential equations can be interpreted as a sparse grid approximation. By using this interpretation, the method can straightforwardly be generalized to any given quadrature rule for high dimensional integrals like the quasi Monte Carlo method or the polynomial chaos approach. Besides the multilevel quadrature for approximating the solution's expectation, a simple and efficient modification of the approach is proposed to compute the stochastic solution's variance. Numerical results are provided to demonstrate and quantify the approach
A new stochastic collocation finite element method is proposed for the numerical solution of ellipti...
We introduce a new concept of sparsity for the stochastic elliptic operator - div(ɑ(x,ω)∇(•)), which...
The efficient numerical simulation of models described by partial differential equations (PDEs) is a...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
This article is dedicated to multilevel quadrature methods for the rapid solution of stochastic part...
This article is dedicated to multilevel quadrature methods for the rapid solution of stochastic part...
Stochastic PDE eigenvalue problems are useful models for quantifying the uncertainty in several appl...
In Monte Carlo methods quadrupling the sample size halves the error. In simulations of stochastic pa...
We present a model and variance reduction method for the fast and reliable computation of statistica...
Abstract. Stochastic collocation methods for approximating the solution of partial differential equa...
This article is dedicated to the computation of the moments of the solution to stochastic partial di...
We consider the numerical solution of elliptic partial differential equations with random coefficien...
A new stochastic collocation finite element method is proposed for the numerical solution of ellipti...
We introduce a new concept of sparsity for the stochastic elliptic operator - div(ɑ(x,ω)∇(•)), which...
The efficient numerical simulation of models described by partial differential equations (PDEs) is a...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
This article is dedicated to multilevel quadrature methods for the rapid solution of stochastic part...
This article is dedicated to multilevel quadrature methods for the rapid solution of stochastic part...
Stochastic PDE eigenvalue problems are useful models for quantifying the uncertainty in several appl...
In Monte Carlo methods quadrupling the sample size halves the error. In simulations of stochastic pa...
We present a model and variance reduction method for the fast and reliable computation of statistica...
Abstract. Stochastic collocation methods for approximating the solution of partial differential equa...
This article is dedicated to the computation of the moments of the solution to stochastic partial di...
We consider the numerical solution of elliptic partial differential equations with random coefficien...
A new stochastic collocation finite element method is proposed for the numerical solution of ellipti...
We introduce a new concept of sparsity for the stochastic elliptic operator - div(ɑ(x,ω)∇(•)), which...
The efficient numerical simulation of models described by partial differential equations (PDEs) is a...