English

A Multiplicative Version of the Lindley Recursion

Probability 2020-03-03 v1

Abstract

This paper presents an analysis of the stochastic recursion Wi+1=[ViWi+Yi]+W_{i+1} = [V_iW_i+Y_i]^+ 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 Yi=BiAiY_i=B_i-A_i, for independent sequences of non-negative i.i.d.\ random variables {Ai}iN0\{A_i\}_{i\in N_0} and {Bi}iN0\{B_i\}_{i\in N_0}, and assuming {Vi}iN0\{V_i\}_{i\in N_0} is an i.i.d. sequence as well (independent of {Ai}iN0\{A_i\}_{i\in N_0} and {Bi}iN0\{B_i\}_{i\in N_0}), we then consider three special cases: (i) ViV_i attains negative values only and BiB_i has a rational LST, (ii) ViV_i equals a positive value aa with certain probability p(0,1)p\in (0,1) and is negative otherwise, and both AiA_i and BiB_i have a rational LST, (iii) ViV_i is uniformly distributed on [0,1][0,1], and AiA_i 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.

Keywords

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}
}
R2 v1 2026-06-23T14:00:28.257Z