Litcius/Paper detail

On rainbow antimagic coloring of special graphs

B J Septory, Mohammad Imam Utoyo, Dafik Dafik, B Sulistiyono, Ika Hesti Agustin

2021Journal of Physics Conference Series23 citationsDOIOpen Access PDF

Abstract

Abstract Let G(V, E) be a connected, undirected and simple graph with vertex set V(G) and edge set E(G). A labeling of a graph G is a bijection f from V(G) to the set {1, 2,…, | V(G)|}. The bijection f is called rainbow antimagic vertex labeling if for any two edge uv and u’v’ in path x — y,w(uv) = w(u’v ’) w(uv), where w(uv) = f (u) + f (v) and x,y ∈ V(G). A graph G is a rainbow antimagic connection if G has a rainbow antimagic labeling. Thus any rainbow antimagic labeling induces a rainbow coloring of G where the edge uv is assigned with the color w(uv). The rainbow antimagic connection number of G, denoted by rac(G), is the smallest number of colors taken over all rainbow colorings induced by rainbow antimagic labeling of G . In this paper, we show the exact value of the rainbow antimagic connection number of jahangir graph J 2 , m , lemon graph Le m , firecracker graph (F m , 3), complete bipartite graph (K 2 , m ), and double star graph (S m , m ).

Topics & Concepts

CombinatoricsRainbowBijectionMathematicsGraphSimple graphVertex (graph theory)Bipartite graphDiscrete mathematicsPhysicsQuantum mechanicsGraph Labeling and Dimension ProblemsAdvanced Graph Theory Researchgraph theory and CDMA systems