Path problems are a family of optimization and enumeration problems that reduce to determination or evaluation of paths in a directed graph. In this paper we give a convenient algebraic description of block algorithms for solving path problems. We also develop block versions of two Gaussian algorithms, which are counterparts of the conventional Jordan and escalator method respectively. The correctness of the two considered block algorithms is discussed, and their complexity is analyzed. A parallel implementation of the block Jordan algorithm on a transputer network is presented, and the obtained experimental results are listed
this paper, we give a block algorithm for the Gauss-Huard elimination. For distributed memory system...
We present a linear-time algorithm for the path-partition problem in block graphs
AbstractThis paper extends the author's parallel nested dissection algorithm (Pan and Reif, Technica...
Path problems are a family of optimization and enumeration problems that reduce to determination or ...
Path problems are a family of optimization and enumeration problems posed on a directed graph. Gener...
The algebraic path problem is a generalization of the shortest path problem in graphs. Various insta...
Path problems are a family of optimization and enumeration problems involving the determination of p...
Abstract—The development of concepts derived from the generic approach to solving the problem of the...
We present a literature review on the algebraic path problem and describe different sequential and s...
This thesis develops an algebraic theory for path problems such as that of finding the shortest or m...
AbstractA calculational derivation is given of two abstract path algorithms. The first is an all-pai...
ABSTRACT: In this thesis we investigate path finding problems, that is, plan-ning routes from a star...
The problem of finding the shortest paths on weighted graphs is considered. The variants of statemen...
A calculational derivation is given of two abstract path algorithms. The first is an all-pairs algor...
Shortest path problems are fundamental network optimization problems arising in many contexts and ha...
this paper, we give a block algorithm for the Gauss-Huard elimination. For distributed memory system...
We present a linear-time algorithm for the path-partition problem in block graphs
AbstractThis paper extends the author's parallel nested dissection algorithm (Pan and Reif, Technica...
Path problems are a family of optimization and enumeration problems that reduce to determination or ...
Path problems are a family of optimization and enumeration problems posed on a directed graph. Gener...
The algebraic path problem is a generalization of the shortest path problem in graphs. Various insta...
Path problems are a family of optimization and enumeration problems involving the determination of p...
Abstract—The development of concepts derived from the generic approach to solving the problem of the...
We present a literature review on the algebraic path problem and describe different sequential and s...
This thesis develops an algebraic theory for path problems such as that of finding the shortest or m...
AbstractA calculational derivation is given of two abstract path algorithms. The first is an all-pai...
ABSTRACT: In this thesis we investigate path finding problems, that is, plan-ning routes from a star...
The problem of finding the shortest paths on weighted graphs is considered. The variants of statemen...
A calculational derivation is given of two abstract path algorithms. The first is an all-pairs algor...
Shortest path problems are fundamental network optimization problems arising in many contexts and ha...
this paper, we give a block algorithm for the Gauss-Huard elimination. For distributed memory system...
We present a linear-time algorithm for the path-partition problem in block graphs
AbstractThis paper extends the author's parallel nested dissection algorithm (Pan and Reif, Technica...