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Moments of Exit Times from Wedges for Non-homogeneous Random Walks with Asymptotically Zero Drifts

Author

Listed:
  • Iain M. MacPhee

    (Durham University)

  • Mikhail V. Menshikov

    (Durham University)

  • Andrew R. Wade

    (University of Strathclyde)

Abstract

We study quantitative asymptotics of planar random walks that are spatially non-homogeneous but whose mean drifts have some regularity. Specifically, we study the first exit time τ α from a wedge with apex at the origin and interior half-angle α by a non-homogeneous random walk on ℤ2 with mean drift at x of magnitude O(∥x∥−1) as ∥x∥→∞. This is the critical regime for the asymptotic behaviour: under mild conditions, a previous result of the authors stated that τ α 0. Assuming a uniform bound on the walk’s increments, we show that for α s 0; under specific assumptions on the drift field, we show that we can attain ${\mathbb{E}}[ \tau_{\alpha}^{s}] = \infty$ for any s>1/2. We show that there is a phase transition between drifts of magnitude O(∥x∥−1) (the critical regime) and o(∥x∥−1) (the subcritical regime). In the subcritical regime, we obtain a non-homogeneous random walk analogue of a theorem for Brownian motion due to Spitzer, under considerably weaker conditions than those previously given (including work by Varopoulos) that assumed zero drift.

Suggested Citation

  • Iain M. MacPhee & Mikhail V. Menshikov & Andrew R. Wade, 2013. "Moments of Exit Times from Wedges for Non-homogeneous Random Walks with Asymptotically Zero Drifts," Journal of Theoretical Probability, Springer, vol. 26(1), pages 1-30, March.
  • Handle: RePEc:spr:jotpro:v:26:y:2013:i:1:d:10.1007_s10959-012-0411-x
    DOI: 10.1007/s10959-012-0411-x
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    References listed on IDEAS

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    1. Klein Haneveld, L.A. & Pittenger, A.O., 1990. "Escape time for a random walk from an orthant," Stochastic Processes and their Applications, Elsevier, vol. 35(1), pages 1-9, June.
    2. Menshikov, Mikhail V. & Wade, Andrew R., 2010. "Rate of escape and central limit theorem for the supercritical Lamperti problem," Stochastic Processes and their Applications, Elsevier, vol. 120(10), pages 2078-2099, September.
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