Uniform Diophantine approximation with restricted denominators

Abstract

Let b≥2 be an integer and A=(an)n=1∞ be a strictly increasing subsequence of positive integers with η:=n∞an+1an<+∞. For each irrational real number , we denote by vb,A() the supremum of the real numbers v for which, for every sufficiently large integer N, the equation \|ban\|<(baN)-v has a solution n with 1≤ n≤ N. For every v∈[0,η], let Vb,A(v) (Vb,A(v)) be the set of all real numbers such that vb,A()≥v (vb,A()=v) respectively. In this paper, we give some results of the Hausdorfff dimensions of Vb,A(v) and Vb,A(v). When η=1, we prove that the Hausdorfff dimensions of Vb,A(v) and Vb,A(v) are equal to (1-v1+v)2 for any v∈[0,1]. When η>1 and n∞an+1an exists, we show that the Hausdorfff dimension of Vb,A(v) is strictly less than (η-vη+v)2 for some v, which is different with the case η=1, and we give a lower bound of the Hausdorfff dimensions of Vb,A(v) and Vb,A(v) for any v∈[0,η]. Furthermore, we show that this lower bound can be reached for some v.