It is shown that when a directed graph is represented as a binary connection matrix, the problem of finding the shortest path between two nodes of a directed graph, and the problem of determining whether the directed graph has a cycle require at least $O(n^{2})$ operations. Thus the presently known best algorithms are optimal to within a multiplicative constant
Abstract In this paper, we consider the problems of computing the strongly connected components and ...
Given a directed graph, two vertices v and w are 2-vertex-connected if there are two internally vert...
Connectivity related concepts are of fundamental interest in graph theory. The area has received ext...
We study the problem of finding the cycle of minimum cost-to-time ratio in a directed graph with $ n...
In this paper, we introduce an O(nm) time algorithm to determine the minimum length directed cycle (...
We consider the problem of computing a minimum cycle basis in a directed graph. The input to this pr...
The algorithm presented in this paper is for testing whether the connectivity of a large graph of $n...
Abstract. We consider the problem of computing a minimum cycle ba-sis in a directed graph. The input...
We consider the problem of computing a minimum cycle basis in a directed graph. The input to this pr...
We consider the problem of computing a minimum cycle basis in a directed graph. The input to this pr...
Directed s-t connectivity is the problem of detecting whether there is a path from vertex s to verte...
This paper initiates the study of testing properties of directed graphs. In particular, the paper c...
Motivated by very recent work on 2-connectivity in directed graphs, we revisit the problem of comput...
The cycle space of a strongly connected graph has a basis consisting of directed circuits. The conce...
Connectivity (or equivalently, unweighted maximum flow) is an important measure in graph theory and ...
Abstract In this paper, we consider the problems of computing the strongly connected components and ...
Given a directed graph, two vertices v and w are 2-vertex-connected if there are two internally vert...
Connectivity related concepts are of fundamental interest in graph theory. The area has received ext...
We study the problem of finding the cycle of minimum cost-to-time ratio in a directed graph with $ n...
In this paper, we introduce an O(nm) time algorithm to determine the minimum length directed cycle (...
We consider the problem of computing a minimum cycle basis in a directed graph. The input to this pr...
The algorithm presented in this paper is for testing whether the connectivity of a large graph of $n...
Abstract. We consider the problem of computing a minimum cycle ba-sis in a directed graph. The input...
We consider the problem of computing a minimum cycle basis in a directed graph. The input to this pr...
We consider the problem of computing a minimum cycle basis in a directed graph. The input to this pr...
Directed s-t connectivity is the problem of detecting whether there is a path from vertex s to verte...
This paper initiates the study of testing properties of directed graphs. In particular, the paper c...
Motivated by very recent work on 2-connectivity in directed graphs, we revisit the problem of comput...
The cycle space of a strongly connected graph has a basis consisting of directed circuits. The conce...
Connectivity (or equivalently, unweighted maximum flow) is an important measure in graph theory and ...
Abstract In this paper, we consider the problems of computing the strongly connected components and ...
Given a directed graph, two vertices v and w are 2-vertex-connected if there are two internally vert...
Connectivity related concepts are of fundamental interest in graph theory. The area has received ext...