On Distance Antimagic Graphs
Abstract
For an arbitrary set of distances , a -weight of a vertex in a graph under a vertex labeling is defined as , where . A graph is said to be -distance magic if all vertices has the same -vertex-weight, it is said to be -distance antimagic if all vertices have distinct -vertex-weights, and it is called -distance antimagic if the -vertex-weights constitute an arithmetic progression with difference and starting value . In this paper we study some necessary conditions for the existence of -distance antimagic graphs. We conjecture that such conditions are also sufficient. Additionally, we study -distance antimagic labelings for some cycle-related connected graphs: cycles, suns, prisms, complete graphs, wheels, fans, and friendship graphs.
Keywords
Cite
@article{arxiv.1312.7405,
title = {On Distance Antimagic Graphs},
author = {Rinovia Simanjuntak and Kristiana Wijaya},
journal= {arXiv preprint arXiv:1312.7405},
year = {2013}
}
Comments
11 pages, 1 figure, 37th Australasian Conference on Combinatorial Mathematics and Combinatorial Computing