We consider the problem of finding a balanced ordering of the vertices of a graph. More precisely, we want to minimise the sum, taken over all vertices v, of the difference between the number of neighbours to the left and right of v. This problem, which has applications in graph drawing, was recently introduced by Biedl et al. [Discrete Applied Math. 148:27--48, 2005]. They proved that the problem is solvable in polynomial time for graphs with maximum degree three, but NP-hard for graphs with maximum degree six. One of our main results is to close the gap in these results, by proving NP-hardness for graphs with maximum degree four. Furthermore, we prove that the problem remains NP-hard for planar graphs with maximum degree four...
Let G be an n-node graph. We address the problem of computing a maximum symmetric graph H from G by ...
AbstractGiven a bipartite graph G=(L0,L1,E) and a fixed ordering of the nodes in L0, the problem of ...
Suppose you are given a graph $G=(V,E)$ with a weight assignment $w:V\rightarrow\mathbb{Z}$ and that...
Graphs and AlgorithmsWe consider the problem of finding a balanced ordering of the vertices of a gra...
We consider the problem of determining a balanced ordering of the vertices of a graph; that is, the ...
AbstractIn this paper we consider the problem of determining a balanced ordering of the vertices of ...
Abstract. In the Imbalance Minimization problem we are given a graph G = (V,E) and an integer b and ...
Combinatorial Optimization problems play central role in applied mathematics and computer science. A...
An ordering of a graph G is a bijection of V(G) to {1, . . . , |V(G)|}. In this thesis, we consider ...
Abstract: Given an ordering of the vertices of a graph one can construct a maximal stable set of tha...
We show that ordering vertices of a graph subject to some objective function is a difficult task
Given a bipartite graph G = (L0, L1, E) and a fixed ordering of the nodes in L0, the problem of find...
International audienceLinear Ordering Problem (LOP) has receive significant attention in different a...
International audienceWe study the problem of orienting the edges of a graph such that the minimum o...
In 1997, Ng and Schultz introduced the idea of cycle orderability. For a positive integer k, a graph...
Let G be an n-node graph. We address the problem of computing a maximum symmetric graph H from G by ...
AbstractGiven a bipartite graph G=(L0,L1,E) and a fixed ordering of the nodes in L0, the problem of ...
Suppose you are given a graph $G=(V,E)$ with a weight assignment $w:V\rightarrow\mathbb{Z}$ and that...
Graphs and AlgorithmsWe consider the problem of finding a balanced ordering of the vertices of a gra...
We consider the problem of determining a balanced ordering of the vertices of a graph; that is, the ...
AbstractIn this paper we consider the problem of determining a balanced ordering of the vertices of ...
Abstract. In the Imbalance Minimization problem we are given a graph G = (V,E) and an integer b and ...
Combinatorial Optimization problems play central role in applied mathematics and computer science. A...
An ordering of a graph G is a bijection of V(G) to {1, . . . , |V(G)|}. In this thesis, we consider ...
Abstract: Given an ordering of the vertices of a graph one can construct a maximal stable set of tha...
We show that ordering vertices of a graph subject to some objective function is a difficult task
Given a bipartite graph G = (L0, L1, E) and a fixed ordering of the nodes in L0, the problem of find...
International audienceLinear Ordering Problem (LOP) has receive significant attention in different a...
International audienceWe study the problem of orienting the edges of a graph such that the minimum o...
In 1997, Ng and Schultz introduced the idea of cycle orderability. For a positive integer k, a graph...
Let G be an n-node graph. We address the problem of computing a maximum symmetric graph H from G by ...
AbstractGiven a bipartite graph G=(L0,L1,E) and a fixed ordering of the nodes in L0, the problem of ...
Suppose you are given a graph $G=(V,E)$ with a weight assignment $w:V\rightarrow\mathbb{Z}$ and that...