A labeling of the vertices of a graph by elements of any abelian group A induces a labeling of the edges by summing the labels of their endpoints. Hovey defined the graph G to be A-cordial if it has such a labeling where the vertex labels and the edge labels are both evenly-distributed over A in a technical sense. His conjecture that all trees T are A-cordial for all cyclic groups A remains wide open, despite significant attention. Curiously, there has been very little study of whether Hovey’s conjecture might extend beyond the class of cyclic groups. We initiate this study by analyzing the larger class of finite abelian groups A such that all path graphs are A-cordial. We conjecture a complete characterization of such groups, and establish...
In this paper we introduce quotient cordial labeling of graphs, respectively denote the number of ed...
An edge product cordial labeling is a variant of the well-known cordial labeling. In this paper we c...
A function f from vertex set V of a graph G to the set {0, 1} is called cordial labeling if the edge...
AbstractWe introduce A-cordial graphs, for an abelian group A. (If A = Zk we call them k-cordial gra...
Hovey introduced A-cordial labelings in [4] as a simultaneous generalization of cordial and harmonio...
Hovey introduced A-cordial labelings as a generalization of cordial and harmonious labelings [7]. If...
Hovey introduced A-cordial labelings as a generalization of cordial and harmonious labelings [7]. If...
AbstractIn this paper we give an equivalent definition of a cordial graph. The definition implies a ...
AbstractBy using the structure of the adjacency matrix of a cordial graph, we characterize cordial g...
We extend the denition of edge-cordial graphs due to Ng and Lee for graphs on 4k, 4k+1, and 4k+3 ver...
An integer cordial labeling of a graph $G(p,q)$ is an injective map $f:V\rightarrow [-\frac{p}{2}......
A graph is said to be cordial if it has a 0-1 labeling that satisfies certain properties. In this pa...
A binary labeling of the vertices of a graph G is cordial if the number of vertices labeled 0 and th...
Let G = (V; E) be a graph and let f: V! f0; 1g be a mapping from the set of vertices to f0; 1g and f...
Graph theory is an important subject within discrete mathematics and computer science. The subject i...
In this paper we introduce quotient cordial labeling of graphs, respectively denote the number of ed...
An edge product cordial labeling is a variant of the well-known cordial labeling. In this paper we c...
A function f from vertex set V of a graph G to the set {0, 1} is called cordial labeling if the edge...
AbstractWe introduce A-cordial graphs, for an abelian group A. (If A = Zk we call them k-cordial gra...
Hovey introduced A-cordial labelings in [4] as a simultaneous generalization of cordial and harmonio...
Hovey introduced A-cordial labelings as a generalization of cordial and harmonious labelings [7]. If...
Hovey introduced A-cordial labelings as a generalization of cordial and harmonious labelings [7]. If...
AbstractIn this paper we give an equivalent definition of a cordial graph. The definition implies a ...
AbstractBy using the structure of the adjacency matrix of a cordial graph, we characterize cordial g...
We extend the denition of edge-cordial graphs due to Ng and Lee for graphs on 4k, 4k+1, and 4k+3 ver...
An integer cordial labeling of a graph $G(p,q)$ is an injective map $f:V\rightarrow [-\frac{p}{2}......
A graph is said to be cordial if it has a 0-1 labeling that satisfies certain properties. In this pa...
A binary labeling of the vertices of a graph G is cordial if the number of vertices labeled 0 and th...
Let G = (V; E) be a graph and let f: V! f0; 1g be a mapping from the set of vertices to f0; 1g and f...
Graph theory is an important subject within discrete mathematics and computer science. The subject i...
In this paper we introduce quotient cordial labeling of graphs, respectively denote the number of ed...
An edge product cordial labeling is a variant of the well-known cordial labeling. In this paper we c...
A function f from vertex set V of a graph G to the set {0, 1} is called cordial labeling if the edge...