Hecke groups, linear recurrences, and Kepler limits

Abstract

We study the linear fractional transformations in the Hecke group G() where is either root of x2 - x -1 (the larger root being the "golden ratio" φ = 2 π5.) Let g ∈ G() and let z be a generic element of the upper half-plane. Exploiting the fact that 2 = -1, we find that g(z) is a quotient of linear polynomials in z such that the coefficients of z1 and z0 in the numerator and denominator of g(z) appear themselves to be linear polynomials in with coefficients that are certain multiples of Fibonacci numbers. We make somewhat less detailed observations along similar lines about the functions in G(2 πk) for k ≥ 5.