From the theoretical approach to the fill-in minimization problem we present one of the optimal vertex elimination process for a regular finite element mesh M (nxn), and through a number of numerical experiments it is verified that the new process model can always lead to better numerical results comparing to other methods presently in use. Since the process here presented cann't give the actual dissections of M but can clarify how the optimal elimination is, the process includes George's Nested Dissection Method and the method by Duff, Erisman and Reid. By this investigation we can conclude that l) the concept of "Dissection" is neccessary for minimizing the number of fill-ins, 2) the location of the dissection lines can be systematically ...
Recently, in [Found. Comput. Math., 7(2) (2007), 245-269], we proved that an adaptive finite element...
AbstractThis paper is to present a new efficient algorithm by using the finite volume element method...
Advance three-dimensional (3D) scanning devices can create very detail complex 3D polygonal models. ...
From the theoretical approach to the fill-in minimization problem we present one of the optimal vert...
In this paper the fill-in minimization problem which arises at the application of the sparse matrix ...
Nested dissection method is an elimination method for a set of linear algebraic equations with minim...
We propose a new approach to determine the element ordering that minimises the frontwidth in finite ...
In this paper we analyze the optimality of the volume and neighbors algorithm constructing eliminati...
We propose a new approach to determine the element ordering that minimises the frontwidth in finite ...
Various numerical methods are used in engineering analysis, among which the finite element method (F...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities. These ...
In this article a new general algorithm for triangular mesh simplification is proposed. The algorith...
For twenty years, it has been clear that many datasets are excessively complex for applications such...
A common mesh smoothing method strives to improve the shape quality of all elements. Generally a mes...
We study the minimum number g(m, n) (respectively, p(m, n)) of pieces needed to dissect a regular m-...
Recently, in [Found. Comput. Math., 7(2) (2007), 245-269], we proved that an adaptive finite element...
AbstractThis paper is to present a new efficient algorithm by using the finite volume element method...
Advance three-dimensional (3D) scanning devices can create very detail complex 3D polygonal models. ...
From the theoretical approach to the fill-in minimization problem we present one of the optimal vert...
In this paper the fill-in minimization problem which arises at the application of the sparse matrix ...
Nested dissection method is an elimination method for a set of linear algebraic equations with minim...
We propose a new approach to determine the element ordering that minimises the frontwidth in finite ...
In this paper we analyze the optimality of the volume and neighbors algorithm constructing eliminati...
We propose a new approach to determine the element ordering that minimises the frontwidth in finite ...
Various numerical methods are used in engineering analysis, among which the finite element method (F...
We construct quasi-optimal elimination trees for 2D finite element meshes with singularities. These ...
In this article a new general algorithm for triangular mesh simplification is proposed. The algorith...
For twenty years, it has been clear that many datasets are excessively complex for applications such...
A common mesh smoothing method strives to improve the shape quality of all elements. Generally a mes...
We study the minimum number g(m, n) (respectively, p(m, n)) of pieces needed to dissect a regular m-...
Recently, in [Found. Comput. Math., 7(2) (2007), 245-269], we proved that an adaptive finite element...
AbstractThis paper is to present a new efficient algorithm by using the finite volume element method...
Advance three-dimensional (3D) scanning devices can create very detail complex 3D polygonal models. ...