A characterization of dissimilarity families of trees

Abstract

Let T=(T,w) be a weighted finite tree with leaves 1,..., n.For any I :=\i1,..., ik \ ⊂ \1,...,n\, let DI ( T) be the weight of the minimal subtree of T connecting i1,..., ik; the DI ( T) are called k-weights of T. Given a family of real numbers parametrized by the k-subsets of \1,..., n\, \DI\I ∈ \1,...,n\ k, we say that a weighted tree T=(T,w) with leaves 1,..., n realizes the family if DI( T)=DI for any I . In 2006 Levy, Yoshida and Pachter defined, for any positive-weighted tree T=(T,w) with \1,..., n\ as leaf set and any i, j ∈ \1,..., n\, the numbers Si,j to be ΣY ∈ \1,..., n\ -\i,j\ k-2 Di,j ,Y( T) ; they proved that there exists a positive-weighted tree T' =(T',w') such that Di,j( T')=Si,j for any i,j ∈ \1,..., n\ and that this new tree is, in some way, similar to the given one. In this paper, by using the Si,j defined by Levy, Yoshida and Pachter, we characterize families of real numbers parametrized by \1,...,n\ k that are the families of k-weights of weighted trees with leaf set equal to \1,...., n\ and weights of the internal edges positive.