Representation and coding of rational pairs on a Triangular tree and Diophantine approximation in R2

Abstract

In this paper we study the properties of the Triangular tree, a complete tree of rational pairs introduced in cas, in analogy with the main properties of the Farey tree (or Stern-Brocot tree). To our knowledge the Triangular tree is the first generalisation of the Farey tree constructed using the mediant operation. In particular we introduce a two-dimensional representation for the pairs in the tree, a coding which describes how to reach a pair by motions on the tree, and its description in terms of SL(3,Z) matrices. The tree and the properties we study are then used to introduce rational approximations of non-rational pairs.