On the maximum quartet distance between phylogenetic trees
Abstract
A conjecture of Bandelt and Dress states that the maximum quartet distance between any two phylogenetic trees on n leaves is at most ( 23 +o(1))n4. Using the machinery of flag algebras we improve the currently known bounds regarding this conjecture, in particular we show that the maximum is at most (0.69 +o(1))n4. We also give further evidence that the conjecture is true by proving that the maximum distance between caterpillar trees is at most ( 23 +o(1))n4.
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