A note on convergence to stationarity of random processes with immigration

Abstract

Let X1, X2,… be random elements of the Skorokhod space D(R) and 1, 2, … positive random variables such that the pairs (X1,1), (X2,2),… are independent and identically distributed. The random process Y(t):=Σk ≥ 0Xk+1(t-1-…-k)1\1+…+k≤ t\, t∈R, is called random process with immigration at the epochs of a renewal process. Assuming that the distribution of 1 is nonlattice and has finite mean while the process X1 decays sufficiently fast, we prove weak convergence of (Y(u+t))u∈R as t∞ on D(R) endowed with the J1-topology. The present paper continues the line of research initiated in Iksanov, Marynych and Meiners (2015+).