Number is based in special edges, is introduced. The kind of natural extension from edges toward vertex and the set of vertices in the way that, the final notion is number, is studied. The result is obtained which is about the study on the classes of graphs in the matter of new notions. There is the extended notion about having edge amid two vertices toward having some edges in the word of neighbor and in another stage going into the atmosphere of having consecutive edges in the terminology of path and in the upper vision going on the notion about path with jargon and buzzword of distance as if the minimal vertices has concluded the new notions with the word, number
We enumerate the edges in the Hasse diagram of several lattices arising in the combinatorial context...
Number theory is one of the oldest mathematical areas. This is perhaps one of the reasons why there ...
Graph theory has strong historical roots in Mathematics. Its birth is usually associated with the fo...
Number graphs are introduced and the kind of introduction for this type is given. Assigning the numb...
By a graph G = (V,E), we mean a finite and undirected graph without loops and multiple edges. A grap...
The kind of set which is based on edges, is introduced. The analysis on this set is done in the matt...
In this article, some notions about set, weight of set, number, number’s position, special vertex ar...
In this article, some notions about set, weight of set, number, number’s position, special vertex ar...
summary:The total edge-domatic number of a graph is introduced as an edge analogue of the total doma...
A network is a collection of objects connected to each other in some specific way. A graph is a fini...
In this paper we give rules for creating a number triangle T in a manner analogous to that for produ...
Different edges define new form of connections amid vertices. Thus defining new notion of coloring i...
When solving combinatorial problems, it is easier to solve the problem by expressing the different s...
Graph Theory is a graphical representation of a set of vertices which are connected by edges and is ...
Graph theory ia a branch of mathematics which deals with networks of points connected by lines calle...
We enumerate the edges in the Hasse diagram of several lattices arising in the combinatorial context...
Number theory is one of the oldest mathematical areas. This is perhaps one of the reasons why there ...
Graph theory has strong historical roots in Mathematics. Its birth is usually associated with the fo...
Number graphs are introduced and the kind of introduction for this type is given. Assigning the numb...
By a graph G = (V,E), we mean a finite and undirected graph without loops and multiple edges. A grap...
The kind of set which is based on edges, is introduced. The analysis on this set is done in the matt...
In this article, some notions about set, weight of set, number, number’s position, special vertex ar...
In this article, some notions about set, weight of set, number, number’s position, special vertex ar...
summary:The total edge-domatic number of a graph is introduced as an edge analogue of the total doma...
A network is a collection of objects connected to each other in some specific way. A graph is a fini...
In this paper we give rules for creating a number triangle T in a manner analogous to that for produ...
Different edges define new form of connections amid vertices. Thus defining new notion of coloring i...
When solving combinatorial problems, it is easier to solve the problem by expressing the different s...
Graph Theory is a graphical representation of a set of vertices which are connected by edges and is ...
Graph theory ia a branch of mathematics which deals with networks of points connected by lines calle...
We enumerate the edges in the Hasse diagram of several lattices arising in the combinatorial context...
Number theory is one of the oldest mathematical areas. This is perhaps one of the reasons why there ...
Graph theory has strong historical roots in Mathematics. Its birth is usually associated with the fo...