Fractal-Dimensional Properties of Subordinators

Abstract

This work looks at the box-counting dimension of sets related to subordinators (non-decreasing L\'evy processes). It was recently shown in [Savov, 2014] that almost surely δ0U(δ)N(t,δ) = t, where N(t,δ) is the minimal number of boxes of size at most δ needed to cover a subordinator's range up to time t, and U(δ) is the subordinator's renewal function. Our main result is a central limit theorem (CLT) for N(t,δ), complementing and refining work in [Savov, 2014]. Box-counting dimension is defined in terms of N(t,δ), but for subordinators we prove that it can also be defined using a new process obtained by shortening the original subordinator's jumps of size greater than δ. This new process can be manipulated with remarkable ease in comparison to N(t,δ), and allows better understanding of the box-counting dimension of a subordinator's range in terms of its L\'evy measure, improving upon [Corollary 1, Savov, 2014]. Further, we shall prove corresponding CLT and almost sure convergence results for the new process.