Mathematica Bohemica (Dec 2023)

On the domination of triangulated discs

  • Noor A'lawiah Abd Aziz,
  • Nader Jafari Rad,
  • Hailiza Kamarulhaili

DOI
https://doi.org/10.21136/MB.2022.0122-21
Journal volume & issue
Vol. 148, no. 4
pp. 555 – 560

Abstract

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Let $G$ be a $3$-connected triangulated disc of order $n$ with the boundary cycle $C$ of the outer face of $G$. Tokunaga (2013) conjectured that $G$ has a dominating set of cardinality at most $\frac14(n+2)$. This conjecture is proved in Tokunaga (2020) for $G-C$ being a tree. In this paper we prove the above conjecture for $G-C$ being a unicyclic graph. We also deduce some bounds for the double domination number, total domination number and double total domination number in triangulated discs.

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