On local antimagic chromatic number of spider graphs
An edge labeling of a connected graph G = (V, E) is said to be local antimagic if it is a Bijection f : E → {1, …,|E|} such that for any pair of adjacent vertices x and y, f +(x) ≠ f +(y), where the induced vertex label f +(x) = Σf(e), with e ranging over all the edges incident to x. The local antim...
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sg-ntu-dr.10356-1627362022-11-07T07:30:57Z On local antimagic chromatic number of spider graphs Lau, Gee-Choon Shiu, Wai-Chee Soo, Chee-Xian School of Physical and Mathematical Sciences Science::Mathematics Local Antimagic Labeling Local Antimagic Chromatic Number An edge labeling of a connected graph G = (V, E) is said to be local antimagic if it is a Bijection f : E → {1, …,|E|} such that for any pair of adjacent vertices x and y, f +(x) ≠ f +(y), where the induced vertex label f +(x) = Σf(e), with e ranging over all the edges incident to x. The local antimagic chromatic number of G, denoted by χla (G), is the minimum number of distinct induced vertex labels over all local antimagic labelings of G. In this paper, we first show that a d-leg spider graph has d + 1 ≤ χla ≤ + 2. We then obtain many sufficient conditions such that both the values are attainable. Finally, we show that each 3-leg spider has χla = 4 if not all legs are of odd length. No 3-leg spider with all odd leg lengths and χla = 5 is found. This provides partial solutions to the characterization of k-pendant trees T with χla (T) = k + 1 or k + 2. We conjecture that almost all d-leg spiders of size q that satisfy d(d + 1) ≤ 2(2q - 1) with each leg length at least 2 has χla = d + 1. 2022-11-07T07:30:57Z 2022-11-07T07:30:57Z 2022 Journal Article Lau, G., Shiu, W. & Soo, C. (2022). On local antimagic chromatic number of spider graphs. Journal of Discrete Mathematical Sciences and Cryptography, 1-37. https://dx.doi.org/10.1080/09720529.2021.1892270 0972-0529 https://hdl.handle.net/10356/162736 10.1080/09720529.2021.1892270 2-s2.0-85126247916 1 37 en Journal of Discrete Mathematical Sciences and Cryptography © 2022 Taru Publications. All rights reserved. |
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Science::Mathematics Local Antimagic Labeling Local Antimagic Chromatic Number Lau, Gee-Choon Shiu, Wai-Chee Soo, Chee-Xian On local antimagic chromatic number of spider graphs |
| description |
An edge labeling of a connected graph G = (V, E) is said to be local antimagic if it is a Bijection f : E → {1, …,|E|} such that for any pair of adjacent vertices x and y, f +(x) ≠ f +(y), where the induced vertex label f +(x) = Σf(e), with e ranging over all the edges incident to x. The local antimagic chromatic number of G, denoted by χla (G), is the minimum number of distinct induced vertex labels over all local antimagic labelings of G. In this paper, we first show that a d-leg spider graph has d + 1 ≤ χla ≤ + 2. We then obtain many sufficient conditions such that both the values are attainable. Finally, we show that each 3-leg spider has χla = 4 if not all legs are of odd length. No 3-leg spider with all odd leg lengths and χla = 5 is found. This provides partial solutions to the characterization of k-pendant trees T with χla (T) = k + 1 or k + 2. We conjecture that almost all d-leg spiders of size q that satisfy d(d + 1) ≤ 2(2q - 1) with each leg length at least 2 has χla = d + 1. |
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School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Lau, Gee-Choon Shiu, Wai-Chee Soo, Chee-Xian |
| format |
Article |
| author |
Lau, Gee-Choon Shiu, Wai-Chee Soo, Chee-Xian |
| author_sort |
Lau, Gee-Choon |
| title |
On local antimagic chromatic number of spider graphs |
| title_short |
On local antimagic chromatic number of spider graphs |
| title_full |
On local antimagic chromatic number of spider graphs |
| title_fullStr |
On local antimagic chromatic number of spider graphs |
| title_full_unstemmed |
On local antimagic chromatic number of spider graphs |
| title_sort |
on local antimagic chromatic number of spider graphs |
| publishDate |
2022 |
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https://hdl.handle.net/10356/162736 |
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1749179180006768640 |