The integer-antimagic spectra of Hamiltonian graphs

Ugur Odabasi; Dan Roberts; Richard M. Low

doi:10.5614/ejgta.2021.9.2.5

Electronic Journal of Graph Theory and Applications (Oct 2021)

The integer-antimagic spectra of Hamiltonian graphs

Ugur Odabasi,
Dan Roberts,
Richard M. Low

Affiliations

Ugur Odabasi: Department of Engineering Sciences, Istanbul University-Cerrahpasa, Istanbul, 34320, Turkey
Dan Roberts: Department of Mathematics, Illinois Wesleyan University, Bloomington, IL, 61701, USA
Richard M. Low: Department of Mathematics and Statistics, San Jose State University, San Jose, CA, 95192, USA

DOI: https://doi.org/10.5614/ejgta.2021.9.2.5
Journal volume & issue: Vol. 9, no. 2
pp. 301 – 308

Abstract

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Let A be a nontrivial abelian group. A connected simple graph G = (V, E) is A-antimagic, if there exists an edge labeling f : E(G)→A ∖ {0A} such that the induced vertex labeling f+(v)=∑{u, v}∈E(G)f({u, v}) is a one-to-one map. 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 all Hamiltonian graphs.

hamiltonian graphs, graph labeling, group-antimagic labeling

Published in Electronic Journal of Graph Theory and Applications

ISSN: 2338-2287 (Print)
Publisher: Indonesian Combinatorial Society (InaCombS); Graph Theory and Applications (GTA) Research Centre; University of Newcastle, Australia; Institut Teknologi Bandung (ITB), Indonesia
Country of publisher: Indonesia
LCC subjects: Science: Mathematics
Website: http://www.ejgta.org/

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