Singular integrals of stable subordinator

Abstract

It is well known that ∫01 t-θ d t<∞ for θ ∈ (0,1) and ∫01 t-θ d t=∞ for θ ∈ [1,∞). Since t can be taken as an α-stable subordinator with α=1, it is natural to ask whether ∫01 t-θ d St has a similar property when St is an α-stable subordinator with α ∈ (0,1). We show that θ= 1α is the border line such that ∫01 t-θ d St is finite a.s. for θ ∈ (0, 1α) and blows up a.s. for θ ∈ [1α,∞). When α=1, our result recovers that of ∫01 t-θ d t. Moreover, we give a p-th moment estimate for the integral when θ ∈ (0, 1α).