Solutions of diophantine equations as periodic points of p-adic algebraic functions, III

Abstract

All the periodic points of a certain algebraic function related to the Rogers-Ramanujan continued fraction r(τ) are determined. They turn out to be 0, -1 52, and the conjugates over Q of the values r(wd/5), where wd is one of a specific set of algebraic integers, divisible by the square of a prime divisor of 5, in the field Kd=Q(-d), as -d ranges over all negative quadratic discriminants for which (-d5) = +1. This yields new insights on class numbers of orders in the fields Kd. Conjecture 1 of Part I is proved for the prime p=5, showing that the ring class fields over fields of type Kd whose conductors are relatively prime to 5 coincide with the fields generated over Q by the periodic points (excluding -1) of a fixed 5-adic algebraic function.