The generalised Hausdorff measure of sets of Dirichlet non-improvable numbers

Abstract

Let : R+ R+ be a non-increasing function. A real number x is said to be -Dirichlet improvable if the system |qx-p|< \, (t) \ \ and \ \ |q|<t has a non-trivial integer solution for all large enough t. Denote the collection of such points by D(). In this paper, we prove a zero-infinity law valid for all dimension functions under natural non-restrictive conditions. Some of the consequences are zero-infinity laws, for all essentially sub-linear dimension functions proved by Hussain-Kleinbock-Wadleigh-Wang (2018), for some non-essentially sub-linear dimension functions, and for all dimension functions but with a growth condition on the approximating function.