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On the Study of Rainbow Antimagic Connection Number of Comb Product of Friendship Graph and Tree
2022
Symmetry
Given a graph G with vertex set V(G) and edge set E(G), for the bijective function f(V(G))→{1,2,⋯,|V(G)|}, the associated weight of an edge xy∈E(G) under f is w(xy)=f(x)+f(y). If all edges have pairwise distinct weights, the function f is called an edge-antimagic vertex labeling. A path P in the vertex-labeled graph G is said to be a rainbow x−y path if for every two edges xy,x′y′∈E(P) it satisfies w(xy)≠w(x′y′). The function f is called a rainbow antimagic labeling of G if there exists a
doi:10.3390/sym15010012
fatcat:mpjnrxq6mvdulkyuyol6yy7pay