Add to ORKGWe give a state-of-the-art survey of the thickness of a graph from both a theoretical and a practical point of view. After summarizing the relevant results concerning this topological invariant of a graph, we deal with practical computation of the thickness. We present some modifications of a basic heuristic and investigate their usefulness for evaluating the thickness and determining a decomposition of a graph in planar subgraphs
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
The thickness problem on graphs is $\cal NP$-hard and only few results concerning this graph invaria...
This paper studies questions about duality between crossings and non-crossings in graph drawings via...
We give a state-of-the-art survey of the thickness of a graph from both a theoretical and a practica...
AbstractThe book thickness bt(G) of a graph G is defined, its basic properties are delineated, and r...
We define the geometric thickness of a graph to be the smallest number of layers such that we can dr...
AbstractWe investigate the relationship between geometric thickness, thickness, outerthickness, and ...
Abstract. We dene the geometric thickness of a graph to be the small-est number of layers such that ...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
AbstractWe investigate the relationship between geometric thickness, thickness, outerthickness, and ...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
. We define the geometric thickness of a graph to be the smallest number of layers such that we can ...
The thickness problem on graphs is $\cal NP$-hard and only few results concerning this graph invaria...
AbstractThe thickness of a graph is the minimum number of planar subgraphs into which the graph can ...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
The thickness problem on graphs is $\cal NP$-hard and only few results concerning this graph invaria...
This paper studies questions about duality between crossings and non-crossings in graph drawings via...
We give a state-of-the-art survey of the thickness of a graph from both a theoretical and a practica...
AbstractThe book thickness bt(G) of a graph G is defined, its basic properties are delineated, and r...
We define the geometric thickness of a graph to be the smallest number of layers such that we can dr...
AbstractWe investigate the relationship between geometric thickness, thickness, outerthickness, and ...
Abstract. We dene the geometric thickness of a graph to be the small-est number of layers such that ...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
AbstractWe investigate the relationship between geometric thickness, thickness, outerthickness, and ...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
. We define the geometric thickness of a graph to be the smallest number of layers such that we can ...
The thickness problem on graphs is $\cal NP$-hard and only few results concerning this graph invaria...
AbstractThe thickness of a graph is the minimum number of planar subgraphs into which the graph can ...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
The thickness problem on graphs is $\cal NP$-hard and only few results concerning this graph invaria...
This paper studies questions about duality between crossings and non-crossings in graph drawings via...