A Multiplicative Version of the Lindley Recursion
Abstract
This paper presents an analysis of the stochastic recursion that can be interpreted as an autoregressive process of order 1, reflected at 0. We start our exposition by a discussion of the model's stability condition. Writing , for independent sequences of non-negative i.i.d.\ random variables and , and assuming is an i.i.d. sequence as well (independent of and ), we then consider three special cases: (i) attains negative values only and has a rational LST, (ii) equals a positive value with certain probability and is negative otherwise, and both and have a rational LST, (iii) is uniformly distributed on , and is exponentially distributed. In all three cases we derive transient and stationary results, where the transient results are in terms of the transform at a geometrically distributed epoch.
Cite
@article{arxiv.2003.00936,
title = {A Multiplicative Version of the Lindley Recursion},
author = {Onno Boxma and Andreas Löpker and Michel Mandjes and Zbigniew Palmowski},
journal= {arXiv preprint arXiv:2003.00936},
year = {2020}
}