On Agreement Subtrees in Multiple Pylogenetic Trees

Abstract

Snir and Yuster [Discrete Appl. Math. 347 (2026) 160--171] asked for the least number h(k) such that k unrooted binary phylogenetic trees on the same h(k) leaves always share a common quartet. We give a new upper bound for the k-tree version of the Maximum Agreement Subtree problem, namely an upper bound for the number of leaves, on which k unrooted binary phylogenetic trees always share a common induced binary subtree on n leaves, which is a four-times iterated exponential function. For h(k), this implies a four-times iterated exponential upper bound. We also set an exponential lower bound for h(k).

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