Abstract. In this paper we study the numerical homogenization of nonlinear random parabolic equations. This procedure is developed within a finite element framework. A careful choice of multiscale finite element bases and the global formulation of the problem on the coarse grid allow us to prove the convergence of the numerical method to the homogenized solution of the equation. The relation of the proposed numerical homogenization procedure to multiscale finite element methods is discussed. Within our numerical procedure one is able to approximate the gradients of the solutions. To show this feature of our method we develop numerical correctors that contain two scales, the numerical and the physical. Finally, we would like to note that our...
AbstractWe study the homogenization problem for a random parabolic operator with coefficients rapidl...
ABSTRACT. We consider nonlinear parabolic equations of Hamilton–Jacobi– Bellman type. The Lagrangian...
Coupling heterogeneous multiscale FEM with Runge-Kutta methods for parabolic homogenization problems...
Abstract. We consider the homogenization of nonlinear random para-bolic operators. Depending on the ...
In this paper we study the convergence of the multiscale finite element method for nonlinear and ran...
In this paper we review various numerical homogenization methods for monotone parabolic problems wit...
Homogenization is a collection of powerful techniques in partial differential equations that are use...
Abstract. In this paper we construct a numerical homogenization technique for nonlinear elliptic equ...
We introduce and analyze an efficient numerical homogenization method for a class of nonlinear parab...
This thesis is mainly devoted to homogenization theory and it consists of an introduction, five pape...
We propose a multiscale method based on a finite element heterogeneous multiscale method (...
AbstractThe aim of this work is to show how to homogenize a semilinear parabolic second-order partia...
Numerical methods for parabolic homogenization problems combining finite element methods (FEMs) in s...
69 pages, minor revisionInternational audienceWe develop a quantitative theory of stochastic homogen...
This thesis deals with quantitative stochastic homogenization of parabolic partial differential equa...
AbstractWe study the homogenization problem for a random parabolic operator with coefficients rapidl...
ABSTRACT. We consider nonlinear parabolic equations of Hamilton–Jacobi– Bellman type. The Lagrangian...
Coupling heterogeneous multiscale FEM with Runge-Kutta methods for parabolic homogenization problems...
Abstract. We consider the homogenization of nonlinear random para-bolic operators. Depending on the ...
In this paper we study the convergence of the multiscale finite element method for nonlinear and ran...
In this paper we review various numerical homogenization methods for monotone parabolic problems wit...
Homogenization is a collection of powerful techniques in partial differential equations that are use...
Abstract. In this paper we construct a numerical homogenization technique for nonlinear elliptic equ...
We introduce and analyze an efficient numerical homogenization method for a class of nonlinear parab...
This thesis is mainly devoted to homogenization theory and it consists of an introduction, five pape...
We propose a multiscale method based on a finite element heterogeneous multiscale method (...
AbstractThe aim of this work is to show how to homogenize a semilinear parabolic second-order partia...
Numerical methods for parabolic homogenization problems combining finite element methods (FEMs) in s...
69 pages, minor revisionInternational audienceWe develop a quantitative theory of stochastic homogen...
This thesis deals with quantitative stochastic homogenization of parabolic partial differential equa...
AbstractWe study the homogenization problem for a random parabolic operator with coefficients rapidl...
ABSTRACT. We consider nonlinear parabolic equations of Hamilton–Jacobi– Bellman type. The Lagrangian...
Coupling heterogeneous multiscale FEM with Runge-Kutta methods for parabolic homogenization problems...