Mean Row Values in (u,v)-Calkin-Wilf Trees

Abstract

We fix integers u,v ≥ 1, and consider an infinite binary tree T(u,v)(z) with a root node whose value is a positive rational number z. For every vertex a/b, we label the left child as a/(ua+b) and right child as (a+vb)/b. The resulting tree is known as the (u,v)-Calkin-Wilf tree. As z runs over [1/u,v] Q, the vertex sets of T(u,v)(z) form a partition of Q+. When u=v=1, the mean row value converges to 3/2 as the row depth increases. Our goal is to extend this result for any u,v≥ 1. We show that, when z∈ [1/u,v] Q, the mean row value in T(u,v)(z) converges to a value close to v+ 2/u uniformly on z.