The integer-antimagic spectra of graphs with a chord

Authors

Richard M. Low, San Jose State UniversityFollow
Dan Roberts, Illinois Wesleyan University
Jinze Zheng, Illinois Wesleyan University

Publication Date

1-1-2021

Document Type

Article

Publication Title

Theory and Applications of Graphs

Volume

8

Issue

1

DOI

10.20429/TAG.2021.080101

Abstract

Let A be a nontrival abelian group. A connected simple graph G = (V, E) is Aantimagic if there exists an edge labeling f : E(G) → A \ {0} such that the induced vertex labeling f+ : V (G) → A, defined by f+(v) = Puv∈E(G) f(uv), is injective. The integer-antimagic spectrum of a graph G is the set IAM(G) = {k | G is Zk-antimagic and k ≥ 2}. In this paper, we determine the integer-antimagic spectra for cycles with a chord, paths with a chord, and wheels with a chord.

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 License.

Department

Mathematics and Statistics

Recommended Citation

Richard M. Low, Dan Roberts, and Jinze Zheng. "The integer-antimagic spectra of graphs with a chord" Theory and Applications of Graphs (2021). https://doi.org/10.20429/TAG.2021.080101