Add to ORKGtextWe present a fast direct algorithm for the solution of linear systems arising from elliptic equations. We extend the work of Xia et al. (2009) on combining the multifrontal method with hierarchical matrices. We offer a more geometric interpretation of that approach, extend it in two dimensions to the unstructured mesh case, and detail an adaptive decomposition procedure for selectively refined meshes. Linear time complexity is shown for a quasi-uniform grid and demonstrated via numerical results for the adaptive algorithm. We also provide an extension to three dimensions with proven linear complexity but a more practical variant with slightly worse scaling is also described.Mathematic
Matrices coming from elliptic partial differential equations have been shown to have a low-rank pro...
Submitted for publication to SIAMMatrices coming from elliptic Partial Differential Equations (PDEs)...
For elliptic equations in three dimensions, the runtime of discontinuous Galerkin methods typically ...
textWe present a fast direct algorithm for the solution of linear systems arising from elliptic equ...
This paper introduces the hierarchical interpolative factorization for elliptic par-tial differentia...
In this article we introduce a fast iterative solver for sparse matrices arising from the finite ele...
This paper introduces the hierarchical interpolative factorization for integral equa-tions (HIF-IE) ...
International audienceMatrices coming from elliptic partial differential equations have been shown t...
1. Abstract. This article presents a fast dense solver for hierarchically off-diagonal low-rank (HOD...
A DD (domain decomposition) preconditioner of almost optimal in p arithmetical complexity is present...
The iterative methods for elliptic equations described in the preceding section have many attractive...
AbstractIn this paper we introduce the multiresolution LU factorization of non-standard forms (NS-fo...
AbstractA group of algorithms for the numerical solution of elliptic partial differential equations ...
International audienceMatrices coming from elliptic Partial Differential Equations (PDEs) have been ...
The present work is concerned with topics related to some adaptive methods for the approximate solut...
Matrices coming from elliptic partial differential equations have been shown to have a low-rank pro...
Submitted for publication to SIAMMatrices coming from elliptic Partial Differential Equations (PDEs)...
For elliptic equations in three dimensions, the runtime of discontinuous Galerkin methods typically ...
textWe present a fast direct algorithm for the solution of linear systems arising from elliptic equ...
This paper introduces the hierarchical interpolative factorization for elliptic par-tial differentia...
In this article we introduce a fast iterative solver for sparse matrices arising from the finite ele...
This paper introduces the hierarchical interpolative factorization for integral equa-tions (HIF-IE) ...
International audienceMatrices coming from elliptic partial differential equations have been shown t...
1. Abstract. This article presents a fast dense solver for hierarchically off-diagonal low-rank (HOD...
A DD (domain decomposition) preconditioner of almost optimal in p arithmetical complexity is present...
The iterative methods for elliptic equations described in the preceding section have many attractive...
AbstractIn this paper we introduce the multiresolution LU factorization of non-standard forms (NS-fo...
AbstractA group of algorithms for the numerical solution of elliptic partial differential equations ...
International audienceMatrices coming from elliptic Partial Differential Equations (PDEs) have been ...
The present work is concerned with topics related to some adaptive methods for the approximate solut...
Matrices coming from elliptic partial differential equations have been shown to have a low-rank pro...
Submitted for publication to SIAMMatrices coming from elliptic Partial Differential Equations (PDEs)...
For elliptic equations in three dimensions, the runtime of discontinuous Galerkin methods typically ...