The Minimal Automorphism-Free Tree
Abstract
A finite tree T with |V(T)| ≥ 2 is called automorphism-free if there is no non-trivial automorphism of T. Let AFT be the poset with the element set of all finite automorphism-free trees (up to graph isomorphism) ordered by T1 T2 if T1 can be obtained from T2 by successively deleting one leaf at a time in such a way that each intermediate tree is also automorphism-free. In this paper, we prove that AFT has a unique minimal element. This result gives an affirmative answer to the question asked by Rupinski.
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