Add to ORKGIn this paper, we present a new approach to construct robust multilevel algorithms for elliptic differential equations. The multilevel algorithms consist of multiplicative subspace corrections in spaces spanned by problem dependent generalized prewavelets. These generalized prewavelets are constructed by a local orthogonalization of hierarchical basis functions with respect to a so-called local coarse-grid space. Numerical results show that the local orthogonalization leads to a smaller constant in strengthened Cauchy-Schwarz inequality than the original hierarchical basis functions. This holds also for several equations with discontinuous coefficients. Thus, the corresponding multilevel algorithm is a fast and robust iterative solver
This paper constructs a local generalized finite element basis for elliptic problems with heterogene...
AbstractA wavelet variation of the "Frequency decomposition multi-grid method, Part I" (FDMGM) of Ha...
We present a multiscale (or hierarchical) approximation of elliptic variational inequalities where t...
this paper, we present a new approach to construct robust multilevel algorithms for elliptic differe...
ABSTRACT. In this paper, we examine a number of additive and multiplicative multi-level iterative me...
We investigate multilevel Schwarz domain decomposition preconditioners, to efficiently solve linear ...
Abstract. A class of preconditioners for elliptic problems built on ideas borrowed from the digital ...
We investigate multilevel Schwarz domain decomposition preconditioners, to efficiently solve linear ...
ABSTRACT. The goal of this paper is to design optimal multilevel solvers for the finite element appr...
The paper introduces a novel, hierarchical preconditioner based on nested dissection and hierarchica...
A local multilevel product algorithm and its additive version are analyzed for linear systems arisin...
: We survey some of the recent research in developing multilevel algebraic solvers for elliptic prob...
. This paper is the second part of a work on stabilizing the classical hierarchical basis (HB) by us...
Abstract. The concept of multilevel filtering (MF) preconditioning applied to second-order selfadjoi...
Two-level overlapping Schwarz methods for elliptic partial differential equations combine local solv...
This paper constructs a local generalized finite element basis for elliptic problems with heterogene...
AbstractA wavelet variation of the "Frequency decomposition multi-grid method, Part I" (FDMGM) of Ha...
We present a multiscale (or hierarchical) approximation of elliptic variational inequalities where t...
this paper, we present a new approach to construct robust multilevel algorithms for elliptic differe...
ABSTRACT. In this paper, we examine a number of additive and multiplicative multi-level iterative me...
We investigate multilevel Schwarz domain decomposition preconditioners, to efficiently solve linear ...
Abstract. A class of preconditioners for elliptic problems built on ideas borrowed from the digital ...
We investigate multilevel Schwarz domain decomposition preconditioners, to efficiently solve linear ...
ABSTRACT. The goal of this paper is to design optimal multilevel solvers for the finite element appr...
The paper introduces a novel, hierarchical preconditioner based on nested dissection and hierarchica...
A local multilevel product algorithm and its additive version are analyzed for linear systems arisin...
: We survey some of the recent research in developing multilevel algebraic solvers for elliptic prob...
. This paper is the second part of a work on stabilizing the classical hierarchical basis (HB) by us...
Abstract. The concept of multilevel filtering (MF) preconditioning applied to second-order selfadjoi...
Two-level overlapping Schwarz methods for elliptic partial differential equations combine local solv...
This paper constructs a local generalized finite element basis for elliptic problems with heterogene...
AbstractA wavelet variation of the "Frequency decomposition multi-grid method, Part I" (FDMGM) of Ha...
We present a multiscale (or hierarchical) approximation of elliptic variational inequalities where t...