Long time behavior of semi-Markov modulated perpetuity and some related processes
Abstract
Examples of stochastic processes whose state space representations involve functions of an integral type structure It(a,b):=∫0tb(Ys)e-∫sta(Yr)drds, t 0 are studied under an ergodic semi-Markovian environment described by an S valued jump type process Y:=(Ys:s∈R+) that is ergodic with a limiting distribution π∈P(S). Under different assumptions on signs of Eπa(·):=Σj∈ Sπja(j) and tail properties of the sojourn times of Y we obtain different long time limit results for I(a,b):=(I(a,b)t:t 0). In all cases mixture type of laws emerge which are naturally represented through an affine stochastic recurrence equation (SRE) Xd=AX+B,\,\, X\!\!\! (A, B). Examples include explicit long-time representations of pitchfork bifurcation, and regime-switching diffusions under semi-Markov modulated environments, etc.
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