Functional limit theorems for the maxima of perturbed random walks and divergent perpetuities in the M1-topology

Abstract

Let (1,η1), (2,η2),… be a sequence of i.i.d. two-dimensional random vectors. In the earlier article Iksanov and Pilipenko (2014) weak convergence in the J1-topology on the Skorokhod space of n-1/20≤ k≤ ·\,(1+…+k+ηk+1) was proved under the assumption that contributions of 0≤ k≤ n\,(1+…+k) and 1≤ k≤ n\,ηk to the limit are comparable and that n-1/2(1+…+[n·]) is attracted to a Brownian motion. In the present paper, we continue this line of research and investigate a more complicated situation when 1+…+[n·], properly normalized without centering, is attracted to a centered stable L\'evy process, a process with jumps. As a consequence, weak convergence normally holds in the M1-topology. We also provide sufficient conditions for the J1-convergence. For completeness, less interesting situations are discussed when one of the sequences 0≤ k≤ n\,(1+…+k) and 1≤ k≤ n\,ηk dominates the other. An application of our main results to divergent perpetuities with positive entries is given.