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On the stationary tail index of iterated random Lipschitz functions

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  • Alsmeyer, Gerold

Abstract

Let Ψ,Ψ1,Ψ2,… be a sequence of i.i.d. random Lipschitz maps from a complete separable metric space (X,d) with unbounded metric d to itself and let Xn=Ψn∘⋯∘Ψ1(X0) for n=1,2,… be the associated Markov chain of forward iterations with initial value X0 which is independent of the Ψn. Provided that (Xn)n≥0 has a stationary law π and picking an arbitrary reference point x0∈X, we will study the tail behavior of d(x0,X0) under Pπ, viz. the behavior of Pπ(d(x0,X0)>t) as t→∞, in cases when there exist (relatively simple) nondecreasing continuous random functions F,G:R≥→R≥ such that F(d(x0,x))≤d(x0,Ψ(x))≤G(d(x0,x)) for all x∈X and n≥1. In a nutshell, our main result states that, if the iterations of i.i.d. copies of F and G constitute contractive iterated function systems with unique stationary laws πF and πG having power tails of order ϑF and ϑG at infinity, respectively, then lower and upper tail index of ν=Pπ(d(x0,X0)∈⋅) (to be defined in Section 2) are falling in [ϑG,ϑF]. If ϑF=ϑG, which is the most interesting case, this leads to the exact tail index of ν. We illustrate our method, which may be viewed as a supplement of Goldie’s implicit renewal theory, by a number of popular examples including the AR(1)-model with ARCH errors and random logistic transforms.

Suggested Citation

  • Alsmeyer, Gerold, 2016. "On the stationary tail index of iterated random Lipschitz functions," Stochastic Processes and their Applications, Elsevier, vol. 126(1), pages 209-233.
    • Handle: RePEc:eee:spapps:v:126:y:2016:i:1:p:209-233
    DOI: 10.1016/j.spa.2015.08.004
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    References listed on IDEAS

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    1. Elton, John H., 1990. "A multiplicative ergodic theorem for lipschitz maps," Stochastic Processes and their Applications, Elsevier, vol. 34(1), pages 39-47, February.
    2. Alsmeyer, Gerold & Fuh, Cheng-Der, 2001. "Limit theorems for iterated random functions by regenerative methods," Stochastic Processes and their Applications, Elsevier, vol. 96(1), pages 123-142, November.
    3. Engle, Robert F, 1982. "Autoregressive Conditional Heteroscedasticity with Estimates of the Variance of United Kingdom Inflation," Econometrica, Econometric Society, vol. 50(4), pages 987-1007, July.
    4. Andrew A. Weiss, 1984. "Arma Models With Arch Errors," Journal of Time Series Analysis, Wiley Blackwell, vol. 5(2), pages 129-143, March.
    5. Dai, Jack Jie, 2000. "A result regarding convergence of random logistic maps," Statistics & Probability Letters, Elsevier, vol. 47(1), pages 11-14, March.
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    Cited by:

    1. Damek, Ewa & Kołodziejek, Bartosz, 2020. "Stochastic recursions: Between Kesten’s and Grincevičius–Grey’s assumptions," Stochastic Processes and their Applications, Elsevier, vol. 130(3), pages 1792-1819.
    2. Buraczewski, Dariusz & Damek, Ewa, 2017. "A simple proof of heavy tail estimates for affine type Lipschitz recursions," Stochastic Processes and their Applications, Elsevier, vol. 127(2), pages 657-668.

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