On the metric theory of inhomogeneous Diophantine approximation: An Erdos-Vaaler type result

Abstract

In 1958, Sz\"usz proved an inhomogeneous version of Khintchine's theorem on Diophantine approximation. Sz\"usz's theorem states that for any non-increasing approximation function :N (0,1/2) with Σq (q)=∞ and any number γ, the following set \[ W(,γ)=\x∈ [0,1]: |qx-p-γ|< (q) for infinitely many q,p∈N\ \] has full Lebesgue measure. Since then, there are very few results in relaxing the monotonicity condition. In this paper, we show that if γ is can not be approximate by rational numbers too well, then the monotonicity condition can be replaced by the upper bound condition (q)=O((q( q)2)-1). In particular, this covers the case when γ is not Liouville, for example π,e, 2, 2. In general, if γ is irrational, (q)=O(q-1( q)-2) and in addition, \[ (Q∞ Σq=QQ( Q)1/8 (q))=∞, \] then W(,γ) has full Lebesgue measure. Our proof is based on a quantitative study of the discrepancy for irrational rotations.