AbstractA labeling of a graph is a function f from the vertex set to some subset of the natural numbers. The image of a vertex is called its label. We assign the label |f(u)−f(v)| to the edge incident with vertices u and v. In a k-equitable labeling the image of f is the set {0,1,2,…,k−1}. We require both the vertex labels and the edge labels to be as equally distributed as possible, i.e., if vi denotes the number of vertices labeled i and ei denotes the number of edges labeled i, we require |vi−vj|⩽1 and |ei−ej|⩽1 for every i,j in {0,1,2,…,k−1}. Equitable graph labelings were introduced by I. Cahit as a generalization for graceful labeling. We prove that every tree is 3-equitable
If $T=(V,E)$ is a tree on vertex set $V$, where $|V|=n$, a labelling of $T $ is a bijection $\phi$ f...
A graceful labeling of a graph G of size n is an injective assignment of integers from the set {0,1,...
A graceful labelling of an undirected graph G with n edges is a one-to-one function from the set of ...
AbstractA labeling of a graph is a function f from the vertex set to some subset of the natural numb...
The Graceful Tree Conjecture in graph theory has been open for almost half a century. The conjecture...
We assign the labels {0,1,2,3} to the vertices of a graph; each edge is assigned the absolute differ...
International audienceIn this work, we consider equitable proper labellings of graphs, which were re...
In 1990 Cahit[4] proposed the idea of distributing the vertex and edge labels amongሼ0, 1, 2, ... , ...
In this paper, we consider labelings of graphs in which the label on an edge is the absolute value o...
The concept of vertex equitable labeling was introduced in [9]. A graph $G$ is said to be vertex equ...
AbstractIt is easily shown that every path has a graceful labelling, however, in this paper we show ...
Cahit [4] proposed the concept of labeling the vertices and edges among the set of integers {0,1,2,…...
AbstractA labelling of a simple graph G=(V,E) is an assignment f of integers to the vertices of G. U...
When it comes to graphs, there have always been questions about different ways to label the vertices...
AbstractWe show that almost all trees can be equitably 3-colored, that is, with three color classes ...
If $T=(V,E)$ is a tree on vertex set $V$, where $|V|=n$, a labelling of $T $ is a bijection $\phi$ f...
A graceful labeling of a graph G of size n is an injective assignment of integers from the set {0,1,...
A graceful labelling of an undirected graph G with n edges is a one-to-one function from the set of ...
AbstractA labeling of a graph is a function f from the vertex set to some subset of the natural numb...
The Graceful Tree Conjecture in graph theory has been open for almost half a century. The conjecture...
We assign the labels {0,1,2,3} to the vertices of a graph; each edge is assigned the absolute differ...
International audienceIn this work, we consider equitable proper labellings of graphs, which were re...
In 1990 Cahit[4] proposed the idea of distributing the vertex and edge labels amongሼ0, 1, 2, ... , ...
In this paper, we consider labelings of graphs in which the label on an edge is the absolute value o...
The concept of vertex equitable labeling was introduced in [9]. A graph $G$ is said to be vertex equ...
AbstractIt is easily shown that every path has a graceful labelling, however, in this paper we show ...
Cahit [4] proposed the concept of labeling the vertices and edges among the set of integers {0,1,2,…...
AbstractA labelling of a simple graph G=(V,E) is an assignment f of integers to the vertices of G. U...
When it comes to graphs, there have always been questions about different ways to label the vertices...
AbstractWe show that almost all trees can be equitably 3-colored, that is, with three color classes ...
If $T=(V,E)$ is a tree on vertex set $V$, where $|V|=n$, a labelling of $T $ is a bijection $\phi$ f...
A graceful labeling of a graph G of size n is an injective assignment of integers from the set {0,1,...
A graceful labelling of an undirected graph G with n edges is a one-to-one function from the set of ...