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Self-Stabilizing Processes Based on Random Signs

Author

Listed:
  • K. J. Falconer

    (University of St Andrews, North Haugh)

  • J. Lévy Véhel

    (Université Nantes, Laboratoire de Mathématiques Jean Leray)

Abstract

A self-stabilizing process $$\{Z(t), t\in [t_0,t_1)\}$${Z(t),t∈[t0,t1)} is, a random process which when localised, that is, scaled to a fine limit near a given $$t\in [t_0,t_1)$$t∈[t0,t1), has the distribution of an $$\alpha (Z(t))$$α(Z(t))-stable process, where $$\alpha : {\mathbb {R}}\rightarrow (0,2)$$α:R→(0,2) is a given continuous function. Thus, the stability index near t depends on the value of the process at t. In another paper [5] we constructed self-stabilizing processes using sums over plane Poisson point processes in the case of $$\alpha : {\mathbb {R}}\rightarrow (0,1)$$α:R→(0,1) which depended on the almost sure absolute convergence of the sums. Here we construct pure jump self-stabilizing processes when $$\alpha $$α may take values greater than 1 when convergence may no longer be absolute. We do this in two stages, firstly by setting up a process based on a fixed point set but taking random signs of the summands, and then randomising the point set to get a process with the desired local properties.

Suggested Citation

  • K. J. Falconer & J. Lévy Véhel, 2020. "Self-Stabilizing Processes Based on Random Signs," Journal of Theoretical Probability, Springer, vol. 33(1), pages 134-152, March.
  • Handle: RePEc:spr:jotpro:v:33:y:2020:i:1:d:10.1007_s10959-018-0862-9
    DOI: 10.1007/s10959-018-0862-9
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    References listed on IDEAS

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    1. Ronan Le Guével & Jacques Lévy Véhel & Lining Liu, 2015. "On Two Multistable Extensions of Stable Lévy Motion and Their Semi-martingale Representations," Journal of Theoretical Probability, Springer, vol. 28(3), pages 1125-1144, September.
    2. K. J. Falconer & J. Lévy Véhel, 2009. "Multifractional, Multistable, and Other Processes with Prescribed Local Form," Journal of Theoretical Probability, Springer, vol. 22(2), pages 375-401, June.
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