Expected number of induced subtrees shared by two independent copies of a random tree

Abstract

Consider a rooted tree T with leaf-set [n], and with all non-leaf vertices having out-degree 2, at least. A rooted tree T with leaf-set S⊂ [n] is induced by S in T if T is the lowest common ancestor subtree for S, with all its degree-2 vertices suppressed. A "maximum agreement subtree" (MAST) for a pair of two trees T' and T" is a tree T with a largest leaf-set S⊂ [n] such that T is induced by S both in T' and T". Bryant et al. BryMcKSte and Bernstein et al. Ber proved, among other results, that for T' and T" being two independent copies of a random binary (uniform or Yule-Harding distributed) tree T, the likely magnitude order of MAST(T',T") is O(n1/2). We prove this bound for a wide class of random rooted trees : T is a terminal tree of a branching, Galton--Watson, process with an ordered-offspring distribution of mean 1, conditioned on "total number of leaves is n".