Tightness and Convergence of Trimmed L\'evy Processes to Normality at Small Times

Abstract

Let (r,s)Xt be the L\'evy process Xt with the r largest positive jumps and s smallest negative jumps up till time t deleted and let (r) Xt be Xt with the r largest jumps in modulus up till time t deleted. Let at ∈ R and bt>0 be non-stochastic functions in t. We show that the tightness of ((r,s)Xt - at)/bt or ((r) Xt - at)/bt at 0 implies the tightness of all normed ordered jumps, hence the tightness of the untrimmed process (Xt -at)/bt at 0. We use this to deduce that the trimmed process ((r,s)Xt - at)/bt or ((r) Xt - at)/bt converges to N(0,1) or to a degenerate distribution if and only if (Xt-at)/bt converges to N(0,1) or to the same degenerate distribution, as t 0.