The bandwidth, average bandwidth, envelope, profile and antibandwidth of the matrices have been the subjects of study for at least 45 years. These problems have generated considerable interest over the years because of them practical relevance in areas like: solving the system of equations, finite element methods, circuit design, hypertext layout, chemical kinetics, numerical geophysics etc. In this paper a brief description of these problems are made in terms of their definitions, followed by a comparative study of them, using both approaches: matrix geometry and graph theory. Time evolution of the corresponding algorithms as well as a short description of them are made. The work also contains concrete real applications for which a large p...
summary:The matrix of the system of linear algebraic equations, arising in the application of the fi...
The applicability of graph theory for optimizing the sparsity and the bandwidth of cycle adjacency m...
Introduction Given an undirected graph G = (V; E) on n vertices, a linear arrangement (also called ...
In this paper, a new viable bandwidth reduction algorithm for reducing the bandwidth of sparse symme...
Large sparsely populated matrices of diagonal character are common in finite element calculations. C...
Abstract — In this article we first review previous exact approaches as well as theoretical contribu...
AbstractIn this paper we merge recent developments on exact algorithms for finding an ordering of ve...
Since 1969 a standard approach to the reduction of matrix bandwidth and profile has been to grow roo...
The problem of sparse matrix bandwidth reduction is addressed and solved with two approaches suitabl...
AbstractComputational and storage costs of resolution of large sparse linear systems Ax=b can be per...
Most research in algorithm design relies on worst-case analysis for performance comparisons. Unfortu...
Abstract Most research in algorithm design relies on worstcase analysis for performance com parison...
The bandwidth problem seeks for a simultaneous permutation of the rows and columns of the adjacency ...
The bandwidth is an important invariant in graph theory. However, the problem to determine the bandw...
This paper studies heuristics for the bandwidth reduction of large-scale matrices in serial computat...
summary:The matrix of the system of linear algebraic equations, arising in the application of the fi...
The applicability of graph theory for optimizing the sparsity and the bandwidth of cycle adjacency m...
Introduction Given an undirected graph G = (V; E) on n vertices, a linear arrangement (also called ...
In this paper, a new viable bandwidth reduction algorithm for reducing the bandwidth of sparse symme...
Large sparsely populated matrices of diagonal character are common in finite element calculations. C...
Abstract — In this article we first review previous exact approaches as well as theoretical contribu...
AbstractIn this paper we merge recent developments on exact algorithms for finding an ordering of ve...
Since 1969 a standard approach to the reduction of matrix bandwidth and profile has been to grow roo...
The problem of sparse matrix bandwidth reduction is addressed and solved with two approaches suitabl...
AbstractComputational and storage costs of resolution of large sparse linear systems Ax=b can be per...
Most research in algorithm design relies on worst-case analysis for performance comparisons. Unfortu...
Abstract Most research in algorithm design relies on worstcase analysis for performance com parison...
The bandwidth problem seeks for a simultaneous permutation of the rows and columns of the adjacency ...
The bandwidth is an important invariant in graph theory. However, the problem to determine the bandw...
This paper studies heuristics for the bandwidth reduction of large-scale matrices in serial computat...
summary:The matrix of the system of linear algebraic equations, arising in the application of the fi...
The applicability of graph theory for optimizing the sparsity and the bandwidth of cycle adjacency m...
Introduction Given an undirected graph G = (V; E) on n vertices, a linear arrangement (also called ...