A note on uniform random covering problems in metric spaces

Abstract

In this paper, we study the uniform random covering problem in general metric space (X,d). Let ω=(ωn)n∈ N be a sequence of independent identically distributed random variables on (X,μ), and =(n)n∈ N a sequence of positive real numbers. We analyze the size of the set \[U(ω,)=\y∈ X ∀ N1,~∃ 1 n N,~s.t. ~d(ωn,y)<N\,\] and establish the 0-1 law for the Hausdorff dimension of U(ω,), its measure and the event U(ω,)=X. Some sufficient conditions are provided for U(ω,) to have full measure or be countable almost surely. Furthermore, we employ the local dimension of μ to estimate the Hausdorff dimension of U(ω,). While prior work by Koivusalo, Liao and Persson ( Int. Math. Res. Not. 2023) addressed the case of the torus T, we apply our results to the d-dimensional torus Td, and explicit analysis of the Hausdorff dimension in a critical case is given.