We construct quasi-optimal elimination trees for 2D finite element meshes with singularities. These trees minimize the complexity of the solution of the discrete system. The computational cost estimates of the elimination process model the execution of the multifrontal algorithms in serial and in parallel shared-memory executions. Since the meshes considered are a subspace of all possible mesh partitions, we call these minimizers quasi-optimal. We minimize the cost functionals using dynamic programming. Finding these minimizers is more computationally expensive than solving the original algebraic system. Nevertheless, from the insights provided by the analysis of the dynamic programming minima, we propose a heuristic construction of the eli...
AbstractThe secondary optimization problem in dynamic programming consists of finding the “best” ord...
We propose a new approach to determine the element ordering that minimises the frontwidth in finite ...
In this paper we present techniques that result in O(n) time algorithms for computing many propertie...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities.These t...
In this paper we analyze the optimality of the volume and neighbors algorithm constructing eliminati...
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 the optimization of the energy consumption for the multi-frontal so...
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...
AbstractIn this paper we present a multi-criteria optimization of element partition trees and result...
AbstractIn this paper we present a theoretical proof of linear computational cost and complexity for...
This paper describes a direct solver algorithm for a sequence of finite element meshes that are h-re...
From the theoretical approach to the fill-in minimization problem we present one of the optimal vert...
We analyse the performance of direct solvers when applied to a system of linear equations arising fr...
AbstractThe secondary optimization problem in dynamic programming consists of finding the “best” ord...
We propose a new approach to determine the element ordering that minimises the frontwidth in finite ...
In this paper we present techniques that result in O(n) time algorithms for computing many propertie...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities.These t...
In this paper we analyze the optimality of the volume and neighbors algorithm constructing eliminati...
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 the optimization of the energy consumption for the multi-frontal so...
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...
AbstractIn this paper we present a multi-criteria optimization of element partition trees and result...
AbstractIn this paper we present a theoretical proof of linear computational cost and complexity for...
This paper describes a direct solver algorithm for a sequence of finite element meshes that are h-re...
From the theoretical approach to the fill-in minimization problem we present one of the optimal vert...
We analyse the performance of direct solvers when applied to a system of linear equations arising fr...
AbstractThe secondary optimization problem in dynamic programming consists of finding the “best” ord...
We propose a new approach to determine the element ordering that minimises the frontwidth in finite ...
In this paper we present techniques that result in O(n) time algorithms for computing many propertie...