AbstractWe consider the minimum number of cliques needed to partition the edge set of D(G), the distance multigraph of a simple graph G. Equivalently, we seek to minimize the number of elements needed to label the vertices of a simple graph G by sets so that the distance between two vertices equals the cardinality of the intersection of their labels. We use a fractional analogue of this parameter to find lower bounds for the distance multigraphs of various classes of graphs. Some of the bounds are shown to be exact
If G is a graph and P is a partition of V(G), then the partition distance of G is the sum of the dis...
The researcher presents a computer-based procedure in determining the minimum number of 2-cliques an...
A subdivision of graph G, S(G), is the result of subdividing some edges of G. The subdivision number...
We consider the problem of labeling the nodes of a graph in a way that will allow one to compute the...
AbstractWe consider the problem of determining cp(G v Kmc), the smallest number of cliques required ...
AbstractSeveral new tools are presented for determining the number of cliques needed to (edge-)parti...
If G is a graph and P = {V1,..., Vk} is a partition of V (G), then the partition distance of G is th...
AbstractWe study the problem of clique-partitioning a graph. We prove a new general upper bound resu...
This paper studies the polytope of the minimum-span graph labelling problems with integer distance c...
For a collection of graphs G, the distance graph of G is defined to be the graph containing a vertex...
AbstractLet D be a set of positive integers. The distance graph generated by D, denoted by G(Z,D), h...
AbstractGiven a finite set D of positive integers, the distance graph G(Z, D) has Z as the vertex se...
Let M be a set of positive integers. The distance graph generated by M, denoted by G(Z,M), has the s...
Given positive integers m; k and s with m> ks, let Dm;k;s represent the set f1; 2; ;mg fk; ...
AbstractA clique in a graph G is a complete subgraph of G. A clique covering (partition) of G is a c...
If G is a graph and P is a partition of V(G), then the partition distance of G is the sum of the dis...
The researcher presents a computer-based procedure in determining the minimum number of 2-cliques an...
A subdivision of graph G, S(G), is the result of subdividing some edges of G. The subdivision number...
We consider the problem of labeling the nodes of a graph in a way that will allow one to compute the...
AbstractWe consider the problem of determining cp(G v Kmc), the smallest number of cliques required ...
AbstractSeveral new tools are presented for determining the number of cliques needed to (edge-)parti...
If G is a graph and P = {V1,..., Vk} is a partition of V (G), then the partition distance of G is th...
AbstractWe study the problem of clique-partitioning a graph. We prove a new general upper bound resu...
This paper studies the polytope of the minimum-span graph labelling problems with integer distance c...
For a collection of graphs G, the distance graph of G is defined to be the graph containing a vertex...
AbstractLet D be a set of positive integers. The distance graph generated by D, denoted by G(Z,D), h...
AbstractGiven a finite set D of positive integers, the distance graph G(Z, D) has Z as the vertex se...
Let M be a set of positive integers. The distance graph generated by M, denoted by G(Z,M), has the s...
Given positive integers m; k and s with m> ks, let Dm;k;s represent the set f1; 2; ;mg fk; ...
AbstractA clique in a graph G is a complete subgraph of G. A clique covering (partition) of G is a c...
If G is a graph and P is a partition of V(G), then the partition distance of G is the sum of the dis...
The researcher presents a computer-based procedure in determining the minimum number of 2-cliques an...
A subdivision of graph G, S(G), is the result of subdividing some edges of G. The subdivision number...