AbstractIn this paper we present a multi-criteria optimization of element partition trees and resulting orderings for multi-frontal solver algorithms executed for two dimensional h adaptive finite element method. In particular, the problem of optimal ordering of elimination of rows in the sparse matrices resulting from adaptive finite element method computations is reduced to the problem of finding of optimal element partition trees. Given a two dimensional h refined mesh, we find all optimal element partition trees by using the dynamic programming approach. An element partition tree defines a prescribed order of elimination of degrees of freedom over the mesh. We utilize three different metrics to estimate the quality of the element partit...
We analyse the performance of direct solvers when applied to a system of linear equations arising fr...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities. These ...
We propose a new approach to determine the element ordering that minimises the frontwidth in finite ...
AbstractIn this paper we present a multi-criteria optimization of element partition trees and result...
We consider a class of two- and three-dimensional h-refined meshes generated by an adaptive finite e...
We consider a class of two- and three-dimensional h-refined meshes generated by an adaptive finite e...
The hp-adaptive Finite Element Method (hp-FEM) generates a sequence of adaptive grids with different...
In this paper we analyze the optimality of the volume and neighbors algorithm constructing eliminati...
AbstractIn this paper we present the optimization of the energy consumption for the multi-frontal so...
AbstractIn this paper we present a dynamic programming algorithm for finding optimal elimination tre...
In this paper we present a dynamic programming algorithm for finding optimal elimination trees for c...
This paper describes a direct solver algorithm for a sequence of finite element meshes that are h-re...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities.These t...
AbstractThe paper presents performance considerations for Krylov space iterative solvers used in hp-...
AbstractIn this paper, we present a multi-frontal solver algorithm for the adaptive finite element m...
We analyse the performance of direct solvers when applied to a system of linear equations arising fr...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities. These ...
We propose a new approach to determine the element ordering that minimises the frontwidth in finite ...
AbstractIn this paper we present a multi-criteria optimization of element partition trees and result...
We consider a class of two- and three-dimensional h-refined meshes generated by an adaptive finite e...
We consider a class of two- and three-dimensional h-refined meshes generated by an adaptive finite e...
The hp-adaptive Finite Element Method (hp-FEM) generates a sequence of adaptive grids with different...
In this paper we analyze the optimality of the volume and neighbors algorithm constructing eliminati...
AbstractIn this paper we present the optimization of the energy consumption for the multi-frontal so...
AbstractIn this paper we present a dynamic programming algorithm for finding optimal elimination tre...
In this paper we present a dynamic programming algorithm for finding optimal elimination trees for c...
This paper describes a direct solver algorithm for a sequence of finite element meshes that are h-re...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities.These t...
AbstractThe paper presents performance considerations for Krylov space iterative solvers used in hp-...
AbstractIn this paper, we present a multi-frontal solver algorithm for the adaptive finite element m...
We analyse the performance of direct solvers when applied to a system of linear equations arising fr...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities. These ...
We propose a new approach to determine the element ordering that minimises the frontwidth in finite ...