Badly approximable points in twisted Diophantine approximation and Hausdorff dimension

Abstract

For any j1,...,jn>0 with j1+...+jn=1 and any x ∈ Rn, we consider the set of points y ∈ Rn for which max1≤ i≤ n(||qxi-yi||1/ji)>c/q for some positive constant c=c(y) and all q∈ N. These sets are the `twisted' inhomogeneous analogue of Bad(j1,...,jn) in the theory of simultaneous Diophantine approximation. It has been shown that they have full Hausdorff dimension in the non-weighted setting, i.e provided that ji=1/n, and in the weighted setting when x is chosen from Bad(j1,...,jn). We generalise these results proving the full Hausdorff dimension in the weighted setting without any condition on x.