Generalised Hausdorff measure of sets of Dirichlet non-improvable matrices in higher dimensions

Abstract

Let : R+ R+ be a nonincreasing function. A pair (A, b), where A is a real m× n matrix and b∈ Rm, is said to be -Dirichlet improvable, if the system \|A q + b- p\|m<(T), \| q\|n<T is solvable in p∈ Zm, q∈ Zn for all sufficiently large T where \|·\| denotes the supremum norm. For -Dirichlet non-improvable sets, Kleinbock--Wadleigh (2019) proved the Lebesgue measure criterion whereas Kim--Kim (2021) established the Hausdorff measure results. In this paper we obtain the generalised Hausdorff f-measure version of Kim--Kim (2021) results for -Dirichlet non-improvable sets.