Sets of double and triple weights of trees

Abstract

Let T be a weighted tree with n leaves. Let Di,j be the distance between the leaves i and j. Let Di,j,k= (Di,j + Dj,k +Di,k)/2. We will call such numbers "triple weights" of the tree. In this paper, we give a characterization, different from the previous ones, for sets indexed by 2-subsets of a n-set to be double weights of a tree. By using the same ideas,we find also necessary and sufficient conditions for a set of real numbers indexed by 3-subsets of an n-set to be the set of the triple weights of a tree with n leaves. Besides we propose a slight modification of Saitou-Nei's Neighbour-Joining algorithm to reconstruct trees from the data Di,j.