AbstractIn this paper we present the optimization of the energy consumption for the multi-frontal solver algorithm executed over two dimensional grids with point singularities. The multi-frontal solver algorithm is controlled by so-called elimination tree, defining the order of elimination of rows from particular frontal matrices, as well as order of memory transfers for Schur complement matrices. For a given mesh there are many possible elimination trees resulting in different number of floating point operations (FLOPs) of the solver or different amount of data transferred via memory transfers. In this paper we utilize the dynamic programming optimization procedure and we compare elimination trees optimized with respect to FLOPs with elimi...
The hp-adaptive Finite Element Method (hp-FEM) generates a sequence of adaptive grids with different...
AbstractThe multi-frontal direct solver is the state of the art for the direct solution of linear sy...
We analyse the performance of direct solvers when applied to a system of linear equations arising fr...
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...
AbstractIn this paper we present a multi-criteria optimization of element partition trees and result...
AbstractIn this paper, we present a multi-frontal solver algorithm for the adaptive finite element m...
We consider a class of two- and three-dimensional h-refined meshes generated by an adaptive finite e...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities.These t...
We consider a class of two- and three-dimensional h-refined meshes generated by an adaptive finite e...
In this paper we analyze the optimality of the volume and neighbors algorithm constructing eliminati...
The multi-frontal direct solver is the state of the art for the direct solution of linear systems. T...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities. These ...
In this paper we analyze two dimensional grids with point and edge singularities in order to develop...
AbstractIn this paper we present a theoretical proof of linear computational cost and complexity for...
The hp-adaptive Finite Element Method (hp-FEM) generates a sequence of adaptive grids with different...
AbstractThe multi-frontal direct solver is the state of the art for the direct solution of linear sy...
We analyse the performance of direct solvers when applied to a system of linear equations arising fr...
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...
AbstractIn this paper we present a multi-criteria optimization of element partition trees and result...
AbstractIn this paper, we present a multi-frontal solver algorithm for the adaptive finite element m...
We consider a class of two- and three-dimensional h-refined meshes generated by an adaptive finite e...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities.These t...
We consider a class of two- and three-dimensional h-refined meshes generated by an adaptive finite e...
In this paper we analyze the optimality of the volume and neighbors algorithm constructing eliminati...
The multi-frontal direct solver is the state of the art for the direct solution of linear systems. T...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities. These ...
In this paper we analyze two dimensional grids with point and edge singularities in order to develop...
AbstractIn this paper we present a theoretical proof of linear computational cost and complexity for...
The hp-adaptive Finite Element Method (hp-FEM) generates a sequence of adaptive grids with different...
AbstractThe multi-frontal direct solver is the state of the art for the direct solution of linear sy...
We analyse the performance of direct solvers when applied to a system of linear equations arising fr...