Raney Transducers and the Lowest Point of the p-Lagrange spectrum

Abstract

It is well known that the golden ratio φ is the ''most irrational'' number in the sense that its best rational approximations s/t have error 1/(5 t2) and this constant 5 is as low as possible. Given a prime p, how can we characterize the reals x such that x and p x are both ''very irrational''? This is tantamount to finding the lowest point of the p-Lagrange spectrum Lp as previously defined by the third author. We describe an algorithm using Raney transducers that computes Lp if it terminates, which we conjecture it always does. We verify that Lp is the square root of a rational number for primes p < 2000. Mysteriously, the highest values of Lp occur for the Heegner primes 67, 3, and 163, and for all p, the continued fractions of the corresponding very irrational numbers x and p x are in one of three symmetric relations.