We consider two-scale elliptic equations whose coefficients are random. In particular, we study two cases: in the first case, the coefficients are obtained from an ergodic dynamical system acting on a probability space, and in the second the case, the coefficients are periodic in the microscale but are random. We suppose that the coefficients also depend on the macroscopic slow variables. While the effective coefficient of the ergodic homogenization problem is deterministic, to approximate it, it is necessary to solve cell equations in a large but finite size “truncated” cube and compute an approximated effective coefficient from the solution of this equation. This approximated effective coefficient is, however, realization dependent; and t...
We consider the Bayesian inverse homogenization problem of recovering the locally periodic two scale...
We present a Multilevel Quasi-Monte Carlo method, based on rank-1 lattice rules, and demonstrate its...
This paper is a sequel to our previous work $({Kuo, Schwab, Sloan, SIAM J.\ Numer.\ Anal., 2013})$ w...
We consider two-scale elliptic equations whose coefficients are random. In particular, we study two ...
We consider two-scale elliptic equations whose coefficients are random. In particular, we study two ...
In this paper Monte Carlo finite element approximations for elliptic homogenization problems with ra...
In this paper Monte Carlo Finite Element (MC FE) approximations for elliptic homogenization problems...
Abstract. In this paper Monte Carlo Finite Element (MC FE) approximations for elliptic homogenizatio...
In Monte Carlo methods quadrupling the sample size halves the error. In simulations of stochastic pa...
Multi-Level Monte-Carlo Finite Element (MLMC--FE) methods for the solution of stochastic elliptic va...
Many real life problems have multiple spatial scales. In addition to the multiscale nature one has t...
We introduce and analyze a numerical strategy to approximate effective coefficients in stochastic h...
We introduce and analyze a numerical strategy to approximate effective coefficients in stochastic ho...
We propose a stochastic multiscale finite element method (StoMsFEM) to solve random elliptic partial...
Multilevel Monte Carlo finite element methods (MLMC-FEMs) for the solution of stochastic elliptic va...
We consider the Bayesian inverse homogenization problem of recovering the locally periodic two scale...
We present a Multilevel Quasi-Monte Carlo method, based on rank-1 lattice rules, and demonstrate its...
This paper is a sequel to our previous work $({Kuo, Schwab, Sloan, SIAM J.\ Numer.\ Anal., 2013})$ w...
We consider two-scale elliptic equations whose coefficients are random. In particular, we study two ...
We consider two-scale elliptic equations whose coefficients are random. In particular, we study two ...
In this paper Monte Carlo finite element approximations for elliptic homogenization problems with ra...
In this paper Monte Carlo Finite Element (MC FE) approximations for elliptic homogenization problems...
Abstract. In this paper Monte Carlo Finite Element (MC FE) approximations for elliptic homogenizatio...
In Monte Carlo methods quadrupling the sample size halves the error. In simulations of stochastic pa...
Multi-Level Monte-Carlo Finite Element (MLMC--FE) methods for the solution of stochastic elliptic va...
Many real life problems have multiple spatial scales. In addition to the multiscale nature one has t...
We introduce and analyze a numerical strategy to approximate effective coefficients in stochastic h...
We introduce and analyze a numerical strategy to approximate effective coefficients in stochastic ho...
We propose a stochastic multiscale finite element method (StoMsFEM) to solve random elliptic partial...
Multilevel Monte Carlo finite element methods (MLMC-FEMs) for the solution of stochastic elliptic va...
We consider the Bayesian inverse homogenization problem of recovering the locally periodic two scale...
We present a Multilevel Quasi-Monte Carlo method, based on rank-1 lattice rules, and demonstrate its...
This paper is a sequel to our previous work $({Kuo, Schwab, Sloan, SIAM J.\ Numer.\ Anal., 2013})$ w...