Families of Gracefuls Spiders with ℓ(2k + 1) − k, ℓ(2k + 1) − k + 1 and ℓ(2k + 1) + k + 1 Legs
DOI:
https://doi.org/10.37256/cm.6120255497Keywords:
graceful labeling, graph labeling, tree, spiderAbstract
We say that a tree is a spider if has at most one vertex of degree greater than two. We obtain existence of families of gracefuls spiders with ℓ(2k +1)−k, ℓ(2k +1)−k +1 and ℓ(2k +1)+k +1 legs. We provide specific labels for each spider graph, these labels are constructed from graceful path graphs that have a particular label, so there is acorrespondence between some paths and graceful spiders that we are studying, this correspondence is described in an algorithm outlined in the preliminaries.
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Published
2025-01-21
How to Cite
1.
Huamaní NB, Bravo MA, Poma F. Families of Gracefuls Spiders with <i>ℓ</i>(2<i>k</i> + 1) − <i>k, ℓ</i>(2<i>k</i> + 1) − <i>k</i> + 1 and <i>ℓ</i>(2<i>k</i> + 1) + <i>k</i> + 1 Legs. Contemp. Math. [Internet]. 2025 Jan. 21 [cited 2025 Jan. 21];6(1):730-42. Available from: https://ojs.wiserpub.com/index.php/CM/article/view/5497
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Research Article
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Copyright (c) 2025 N. B. Huamaní, et al.
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