Effective multiplicative independence of 3 singular moduli

Abstract

Pila and Tsimerman proved in 2017 that for every k there exists at most finitely many k-tuples (x1,…, xk) of distinct non-zero singular moduli with the property "x1, …,xk are multiplicatively dependent, but any proper subset of them is multiplicatively independent". The proof was non-effective, using Siegel's lower bound for the Class Number. In 2019 Riffaut obtained an effective version of this result for k=2. Moreover, he determined all the instances of xmyn∈ Q×, where x,y are distinct singular moduli and m,n non-zero integers. In this article we obtain a similar result for k=3. We show that xmynzr∈ Q× (where x,y,z are distinct singular moduli and m,n,r non-zero integers) implies that the discriminants of x,y,z do not exceed 1010.