Randomly Weighted Self-normalized L\'evy Processes

Abstract

Let (Ut,Vt) be a bivariate L\'evy process, where Vt is a subordinator and Ut is a L\'evy process formed by randomly weighting each jump of Vt by an independent random variable Xt having cdf F. We investigate the asymptotic distribution of the self-normalized L\'evy process Ut/Vt at 0 and at ∞. We show that all subsequential limits of this ratio at 0 (∞) are continuous for any nondegenerate F with finite expectation if and only if Vt belongs to the centered Feller class at 0 (∞). We also characterize when Ut/Vt has a non-degenerate limit distribution at 0 and ∞.