Add to ORKGFor a given digraph $D$ and distinct $u,v \in V(D)$, we denote by $\lambda_D(u,v)$ the local arc-connectivity from $u$ to $v$. Further, we define the total arc-connectivity $tac(D)$ of $D$ to be $\sum_{\{u,v\}\subseteq V(D)}\lambda_D(u,v)+\lambda_D(v,u)$. We show that, given a graph $G$ and an integer $k$, it is NP-complete to decide whether $G$ has an orientation $\vec{G}$ satisfying $tac(\vec{G})\geq k$. This answers a question of Pekec. On the positive side, we show that the corresponding maximization problem admits a $\frac{2}{3}$-approximation algorithm
Orienter un graphe c'est remplacer chaque arête par un arc de mêmes extrémités. On s'intéresse à la ...
Connectivity augmentation and orientation are two fundamental classes of problems related to graph c...
Connectivity augmentation and orientation are two fundamental classes of problems related to graph c...
AbstractThis paper deals with increasing the arc-connectivity of directed graphs by arc additions, r...
For distinct vertices u and v in a graph G, the connectivity between u and v, denoted κG(u,v), is th...
AbstractThis paper deals with increasing the arc-connectivity of directed graphs by arc additions, r...
This paper deals with increasing the arc-connectivity of directed graphs by arc additions, reversals...
My dissertation research was motivated by Matula and his study of a quantity he called the strength ...
AbstractIn an undirected or a directed graph, the edge-connectivity between two disjoint vertex sets...
This thesis is concerned with 3 classes of problems related to graph theory. Firstly, we deal with g...
This thesis is concerned with 3 classes of problems related to graph theory. Firstly, we deal with g...
Orienting an undirected graph means replacing each edge by an arc with the same ends. We investigate...
Orienting an undirected graph means replacing each edge by an arc with the same ends. We investigate...
For a strongly connected digraph D the restricted arc-connectivity λ′(D) is defined as the minimum c...
For a strongly connected digraph D the restricted arc-connectivity λ'(D) is defined as the minimum c...
Orienter un graphe c'est remplacer chaque arête par un arc de mêmes extrémités. On s'intéresse à la ...
Connectivity augmentation and orientation are two fundamental classes of problems related to graph c...
Connectivity augmentation and orientation are two fundamental classes of problems related to graph c...
AbstractThis paper deals with increasing the arc-connectivity of directed graphs by arc additions, r...
For distinct vertices u and v in a graph G, the connectivity between u and v, denoted κG(u,v), is th...
AbstractThis paper deals with increasing the arc-connectivity of directed graphs by arc additions, r...
This paper deals with increasing the arc-connectivity of directed graphs by arc additions, reversals...
My dissertation research was motivated by Matula and his study of a quantity he called the strength ...
AbstractIn an undirected or a directed graph, the edge-connectivity between two disjoint vertex sets...
This thesis is concerned with 3 classes of problems related to graph theory. Firstly, we deal with g...
This thesis is concerned with 3 classes of problems related to graph theory. Firstly, we deal with g...
Orienting an undirected graph means replacing each edge by an arc with the same ends. We investigate...
Orienting an undirected graph means replacing each edge by an arc with the same ends. We investigate...
For a strongly connected digraph D the restricted arc-connectivity λ′(D) is defined as the minimum c...
For a strongly connected digraph D the restricted arc-connectivity λ'(D) is defined as the minimum c...
Orienter un graphe c'est remplacer chaque arête par un arc de mêmes extrémités. On s'intéresse à la ...
Connectivity augmentation and orientation are two fundamental classes of problems related to graph c...
Connectivity augmentation and orientation are two fundamental classes of problems related to graph c...