The Calkin–Wilf Tree of a Quadratic Surd

Abstract: By using the Calkin-Wilf tree, we prove the irrationality of numbers of the form α = √ N +p q where N is a positive integer which is not a perfect square, p is a rational integer such that p 2 < N and q is a positive integer which divides N −p 2 . For this, we consider an analogue of the Calkin-Wilf tree with root α and we define a special path in this tree which satisfies remarkable properties of periodicity and symmetry. This path is closely related to the continued fraction expansion of α and allows us to g… Show more