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Skolem Number of Kagome Lattice Graphs
Resource type
Authors/contributors
- Carrigan, Braxton (Author)
- Martone, Max (Author)
Title
Skolem Number of Kagome Lattice Graphs
Abstract
A proper Skolem labelling of a graph G is a function assigning a positive integer to each vertex of G such that any two vertices assigned the same integer are that distance apart in the graph. The Skolem number of a graph is smallest number n such that there exists a proper Skolem labelling only using the positive integers less than or equal to n. In this paper, we will begin by proving the Skolem number for another family of subgraphs of the hexagonal lattice and then prove the Skolem number for two families of subgraphs of the Kagome Lattice. © 2025 Georgia Southern University. All rights reserved.
Publication
Theory and Applications of Graphs
Publisher
Georgia Southern University
Date
2025
Volume
12
Issue
1
Pages
1-15
Journal Abbr
Theory Appl. Graphs
Citation Key
carriganSkolemNumberKagome2025
ISSN
2470-9859
Language
English
Library Catalog
Scopus
Citation
Carrigan, B., & Martone, M. (2025). Skolem Number of Kagome Lattice Graphs. Theory and Applications of Graphs, 12(1), 1–15. https://doi.org/10.20429/tag.2025.120107
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