Functional limit theorems for sums of independent geometric L\'evy processes

Abstract

Let i, i∈ N, be independent copies of a L\'evy process \(t),t≥0\. Motivated by the results obtained previously in the context of the random energy model, we prove functional limit theorems for the process \[ZN(t)=Σi=1Nei(sN+t)\] as N∞, where sN is a non-negative sequence converging to +∞. The limiting process depends heavily on the growth rate of the sequence sN. If sN grows slowly in the sense that N∞ N/sN>λ2 for some critical value λ2>0, then the limit is an Ornstein--Uhlenbeck process. However, if λ:=N∞ N/sN∈(0,λ2), then the limit is a certain completely asymmetric α-stable process Yα ;.