On inhomogeneous diophantine approximation and Hausdorff dimension

Let Γ = Z A + Z ⁿ  ⊂ R ⁿ be a dense subgroup of rank n + 1 and let [^(w)] hat{w} (A) denote the exponent of uniform simultaneous rational approximation to the generating point A. For any real number v ≥  [^(w)] hat{w} (A), the Hausdorff dimension of the set B _v of points in R ⁿ that are v-approximable with respect to Γ is shown to be equal to 1/v.