On inhomogeneous extension of Thue-Roth's type inequality with moving targets

Abstract

Let ⊂ Q× be a finitely generated multiplicative group of algebraic numbers. Let δ, β∈ Q× be algebraic numbers with β irrational. In this paper, we prove that there exist only finitely many triples (u, q, p)∈×Z2 with d = [Q(u):Q] such that 0<|δ qu+β-p|<1H(u)qd+, where H(u) denotes the absolute Weil height. As an application of this result, we also prove a transcendence result, which states as follows: Let α>1 be a real number. Let β be an algebraic irrational and λ be a non-zero real algebraic number. For a given real number >0, if there are infinitely many natural numbers n for which ||λαn+β|| < 2- n holds true, then α is transcendental, where ||x|| denotes the distance from its nearest integer. When α and β both are algebraic satisfying same conditions, then a particular result of Kulkarni, Mavraki and Nguyen, proved in [3] asserts that αd is a Pisot number. When β is algebraic irrational, our result implies that no algebraic number α satisfies the inequality for infinitely many natural numbers n. Also, our result strengthens a result of Wagner and Ziegler [6]. The proof of our results uses the Subspace Theorem based on the idea of Corvaja and Zannier [2] together with various modification play a crucial role in the proof.