On the number of minimum dominating sets and total dominating sets in forests
Abstract
We show that the maximum number of minimum dominating sets of a forest with domination number γ is at most 5γ and construct for each γ a tree with domination number γ that has more than 255γ minimum dominating sets. Furthermore, we disprove a conjecture about the number of minimum total dominating sets in forests by Henning, Mohr and Rautenbach.
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