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r-Dynamic Coloring of the Corona Product of Graphs
(Discrete Mathematics, Algorithms and Applications Vol. 12, No. 2 (2020) 2050019, 2020-01-21)
Let G = (V, E) be a graph. A proper k-coloring of graph G is r-dynamic coloring if
for every v, the neighbors of vertex v receive at least min
{
r, d(v)
}
different colors. The
minimum k such that graph G has r-dynamic ...
Local Irregular Vertex Coloring of Some Families Graph
(Journal of Discrete Mathematical Sciences and Cryptography, (DOI : 10.1080/09720529.2020.1754541), 2020-06-09)
All graph in this paper is connected and simple graph. Let d(u, v) be a distance between
any vertex u and v in graph G = (V, E ). A function : ( )
l V G
{1, 2,
, }
k
→
is called vertex irregular
k-labelling ...
On the Local Irregularity Vertex Coloring of Related Grid Graph
(International Journal of Academic and Applied Research (IJAAR), Vol. 4 Issue 2, February – 2020, Pages: 1-4, 2020-02-01)
All graph in this paper is connected and simple graph. Let graph d(u,v) be a distance between any vertex u and v in
graph ( ). A functio ( ) * +n is called vertex irregular k-labelling and ( ) where ...
Elegant Labeling Of Some Graphs
(Journal of Physics: Conference Series, 2020-12-01)
In this paper, we introduce a new notion of graph theory study, namely a local
edge metric dimension. It is a natural extension of metric dimension concept. dG(e, v) =
min{d(x, v), d(y, v)} is the distance between the ...
Elegant Labeling of Some Graphs
(Journal of Physics: Conference Series, 2020-06-19)
An elegant labeling on graph G with vertices and edges is an injective
(one-to-one) mapping from the set of vertices V (G) to the set of non-negative integers
f0; 1; 2; 3; :::; g in such a way that the set of values ...
An Inclusive Local Irregularity Coloring of Graphs
(Advances in Mathematics: Scientific Journal, 2020)
All graph in this paper are connected and simple. Let G = (V, E) be a simple graph, where V (G) is vertex set and E(G) is edge set. The local irregularity vertex coloring of G is l : V (G) → {1, 2, · · · , k} and w : V (G) ...