Maximum Agreement Subtrees and H\"older homeomorphisms between Brownian trees
Abstract
We prove that the size of the largest common subtree between two uniform, independent, leaf-labelled random binary trees of size n is typically less than n1/2- for some >0. Our proof relies on the coupling between discrete random trees and the Brownian tree and on a recursive decomposition of the Brownian tree due to Aldous. Along the way, we also show that almost surely, there is no (1-)-H\"older homeomorphism between two independent copies of the Brownian tree.
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