On simultaneous approximation of algebraic numbers

Abstract

Let ⊂ Q× be a finitely generated multiplicative group of algebraic numbers. Let α1,…,αr∈ Q× be algebraic numbers which are Q-linearly independent and let ε>0 be a given real number. One of the main results that we prove in this article is as follows; There exist only finitely many tuples (u, q, p1,…,pr)∈×Zr+1 with d = [Q(u):Q] for some integer d≥ 1 satisfying |αi q u|>1, αi q u is not a pseudo-Pisot number for some integer i∈\1, …, r\ and 0<|αj qu-pj|<1Hε(u)|q|dr+ for all integers j = 1, 2,…, r, where H(u) is the absolute Weil height. In particular, when r =1, this result was proved by Corvaja and Zannier in [3]. As an application of our result, we also prove a transcendence criterion which generalizes a result of Hancl, Kolouch, Pulcerov\'a and Stepnicka in [4]. The proofs rely on the clever use of the subspace theorem and the underlying ideas from the work of Corvaja and Zannier.