Add to ORKGThe graph G′ obtained from a graph G by identifying two nonadjacent vertices in G having at least one common neighbor is called a 1-fold of G. A sequence G, G1, G2, … , Gk of graphs such that G= G and Gi is a 1-fold of Gi-1 for each i= 1 , 2 , … , k is called a uniform k-folding of G if the graphs in the sequence are all singular or all nonsingular. The fold thickness of G is the largest k for which there is a uniform k-folding of G. We show here that the fold thickness of a singular bipartite graph of order n is n- 3. Furthermore, the fold thickness of a nonsingular bipartite graph is 0, i.e., every 1-fold of a nonsingular bipartite graph is singular. We also determine the fold thickness of some well-known families of graphs such as cycles...
Assume that G is a finite group and let a and b be non-negative integers. We define an undirected gr...
A path-factor is a spanning subgraph F of G such that each component of F is a path of order at leas...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
A graph G0 obtained from G by identifying two non-adjacent vertices in G having a common neighbor is...
The concept of fold thickness is extended to bipartite double, to book graph and to the join graph K...
We define the geometric thickness of a graph to be the smallest number of layers such that we can dr...
The geometric thickness of a graph G is the minimum in-teger k such that there is a straight line dr...
AbstractThe thickness of a graph is the minimum number of planar subgraphs into which the graph can ...
Abstract. We dene the geometric thickness of a graph to be the small-est number of layers such that ...
AbstractWe investigate the relationship between geometric thickness, thickness, outerthickness, and ...
The thickness problem on graphs is $\cal NP$-hard and only few results concerning this graph invaria...
AbstractThe genus γ(G) of a simple graph G is the minimum genus of the orientable surface on which G...
AbstractThe book thickness bt(G) of a graph G is defined, its basic properties are delineated, and r...
A P≥k-factor of a graph G is a spanning subgraph of G whose components are paths of order at least k...
If two non-adjacent vertices of a connected graph that have a common neighbor are identified and the...
Assume that G is a finite group and let a and b be non-negative integers. We define an undirected gr...
A path-factor is a spanning subgraph F of G such that each component of F is a path of order at leas...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...
A graph G0 obtained from G by identifying two non-adjacent vertices in G having a common neighbor is...
The concept of fold thickness is extended to bipartite double, to book graph and to the join graph K...
We define the geometric thickness of a graph to be the smallest number of layers such that we can dr...
The geometric thickness of a graph G is the minimum in-teger k such that there is a straight line dr...
AbstractThe thickness of a graph is the minimum number of planar subgraphs into which the graph can ...
Abstract. We dene the geometric thickness of a graph to be the small-est number of layers such that ...
AbstractWe investigate the relationship between geometric thickness, thickness, outerthickness, and ...
The thickness problem on graphs is $\cal NP$-hard and only few results concerning this graph invaria...
AbstractThe genus γ(G) of a simple graph G is the minimum genus of the orientable surface on which G...
AbstractThe book thickness bt(G) of a graph G is defined, its basic properties are delineated, and r...
A P≥k-factor of a graph G is a spanning subgraph of G whose components are paths of order at least k...
If two non-adjacent vertices of a connected graph that have a common neighbor are identified and the...
Assume that G is a finite group and let a and b be non-negative integers. We define an undirected gr...
A path-factor is a spanning subgraph F of G such that each component of F is a path of order at leas...
The thickness problem on graphs is NP-hard and only few results concerning this graph invariant are ...