Hausdorff measure of sets of Dirichlet non-improvable affine forms

Abstract

For a decreasing real valued function , a pair (A,b) of a real m× n matrix A and b∈Rm is said to be -Dirichlet improvable if the system \|Aq+b-p\|m < (T)\|q\|n < T has a solution p∈Zm, q∈Zn for all sufficiently large T, where \|·\| denotes the supremum norm. Kleinbock and Wadleigh (2019) established an integrability criterion for the Lebesgue measure of the -Dirichlet non-improvable set. In this paper, we prove a similar criterion for the Hausdorff measure of the -Dirichlet non-improvable set. Also, we extend this result to the singly metric case that b is fixed. As an application, we compute the Hausdorff dimension of the set of pairs (A,b) with uniform Diophantine exponents w(A,b)≤ w.