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On r-Dynamic Chromatic Number of the Corronation of Path and Several Graphs
(International Journal of Advanced Engineering Research and Science (IJAERS), [Vol-4, Issue-4, Apr- 2017], 2017-04-09)
This study is a natural extension of k -proper
coloring of any simple and connected graph G. By a n rdynamic
coloring of a graph G, we mean a proper k coloring
of
graph
G
such
that
the
neighbors
of
any
vert ...
Vertex Coloring Edge-Weighting of Coronation by Path Graphs
(IOP Conf. Series: Journal of Physics: Conf. Series 1211 (2019) 012004, 2019-05-07)
In this paper, we study vertex coloring edge of corona graph. A k-edge weigting of
graph G is mapping w : (EG) ! f1; 2; ; kg. An edge-weighting w induces a vertex coloring
Fw : V (G) ! N de ned by fw(v) =
P
v2e
w(e). ...
Local Antimagic r-dynamic Coloring of Graphs
(IOP Conf. Series: Earth and Environmental Science 243 (2019) 012077, 2019-04-09)
Let G = (V; E) be a connected graph. A bijection function f : E(G) !
f1; 2; 3; ; E(G)jg is called a local antimagic labeling if for all uv 2 E(G)s, w(u)
6= w(v),
where w(u) = e2E(u)f(e). Such that, local antimagic ...
On the Chromatic Number Local Irregularity of Related Wheel Graph
(IOP Conf. Series: Journal of Physics: Conf. Series 1211 (2019) 012003, 2019-05-07)
A function f is called a local irregularity vertex coloring if (i) l : V (G) !
f1; 2; ; kg as vertex irregular k-labeling and w : V (G) ! N, for every uv 2 E(G); w(u)
6= w(v)
where w(u) = v2N(u)l(v) and (ii) ...
On the Local Multiset Dimension of Graph With Homogenous Pendant Edges
(Journal of Physics: Conference Series, 2019-12-01)
Let G be a connected graph with E as edge set and V as vertex set . rm(v|W) =
{d(v, s1), d(v, s2), . . . , d(v, sk)} is the multiset representation of a vertex v of G with respect to
W where d(v, si) is a distance between ...
The Local (Adjacency) Metric Dimension of Split Related Complete Graph
(IOP Conf. Series: Journal of Physics: Conf. Series, 2019-04-01)
Let G be a simple graph. A set of vertices, called V (G) and a set of edges, called
E(G) are two sets which form graph G. W is a local adjacency resolving set of G if for every
two distinct vertices x, y and x adjacent ...