Metric results of the intersection of sets in Diophantine approximation

Abstract

Let : R>0→ R>0 be a non-increasing function. Denote by W() the set of -well-approximable points and by E() the set of points x∈[0,1] such that for any 0 < ε < 1 there exist infinitely many (p,q)∈Z×N with (1-ε)(q)< | x-pq|< (q) . In this paper, we investigate the metric properties of the set E(). Specifically, we compute the s-dimensional Hausdorff measure Hs(E()) of E() for a large class of s ∈ (0,1]. Additionally, we establish that H E(1) × ·s × E(n) = \ H E(i)+n-1: 1 i n \, where i:R> 0→ R> 0 is a non-increasing function satisfying i(x)=o(x-2) for 1 i n.

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