English

On Distance Antimagic Graphs

Combinatorics 2013-12-31 v1

Abstract

For an arbitrary set of distances D{0,1,,diam(G)}D\subseteq \{0,1, \ldots, diam(G)\}, a DD-weight of a vertex xx in a graph GG under a vertex labeling f:V{1,2,,v}f:V\rightarrow \{1,2, \ldots , v\} is defined as wD(x)=yND(x)f(y)w_D(x)=\sum_{y\in N_D(x)} f(y), where ND(x)={yVd(x,y)D}N_D(x) = \{y \in V| d(x,y) \in D\}. A graph GG is said to be DD-distance magic if all vertices has the same DD-vertex-weight, it is said to be DD-distance antimagic if all vertices have distinct DD-vertex-weights, and it is called (a,d)D(a,d)-D-distance antimagic if the DD-vertex-weights constitute an arithmetic progression with difference dd and starting value aa. In this paper we study some necessary conditions for the existence of DD-distance antimagic graphs. We conjecture that such conditions are also sufficient. Additionally, we study {1}\{1\}-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

R2 v1 2026-06-22T02:36:06.255Z