Functional Convergence of Linear Sequences in a non-Skorokhod Topology

Abstract

In this article, we prove a new functional limit theorem for the partial sum sequence S[nt]=Σi=1[nt]Xi corresponding to a linear sequence of the form Xi=Σj ∈ cj i-j with i.i.d. innovations (i)i ∈ and real-valued coefficients (cj)j ∈ . This weak convergence result is obtained in space [0,1] endowed with the S-topology introduced in Jakubowski (1992), and the limit process is a linear fractional stable motion (LFSM). One of our result provides an extension of the results of Avram and Taqqu (1992) to the case when the coefficients (cj)j ∈ may not have the same sign. The proof of our result relies on the recent criteria for convergence in Skorokhod's M1-topology (due to Louhichi and Rio (2011)), and a result which connects the weak S-convergence of the sum of two processes with the weak M1-convergence of the two individual processes. Finally, we illustrate our results using some examples and computer simulations.