English

On exceedance times for some processes with dependent increments

Probability 2014-10-09 v2

Abstract

Let Znn0{Z_n}_{n\ge 0} be a random walk with a negative drift and i.i.d. increments with heavy-tailed distribution and let M=supn0ZnM=\sup_{n\ge 0}Z_n be its supremum. Asmussen & Kl{\"u}ppelberg (1996) considered the behavior of the random walk given that M>xM>x, for xx large, and obtained a limit theorem, as xx\to\infty, for the distribution of the quadruple that includes the time \rtreg=\rtreg(x)\rtreg=\rtreg(x) to exceed level xx, position Z\rtregZ_{\rtreg} at this time, position Z\rtreg1Z_{\rtreg-1} at the prior time, and the trajectory up to it (similar results were obtained for the Cram\'er-Lundberg insurance risk process). We obtain here several extensions of this result to various regenerative-type models and, in particular, to the case of a random walk with dependent increments. Particular attention is given to describing the limiting conditional behavior of τ\tau. The class of models include Markov-modulated models as particular cases. We also study fluid models, the Bj{\"o}rk-Grandell risk process, give examples where the order of τ\tau is genuinely different from the random walk case, and discuss which growth rates are possible. Our proofs are purely probabilistic and are based on results and ideas from Asmussen, Schmidli & Schmidt (1999), Foss & Zachary (2002), and Foss, Konstantopoulos & Zachary (2007).

Keywords

Cite

@article{arxiv.1205.5793,
  title  = {On exceedance times for some processes with dependent increments},
  author = {Søren Asmussen and Sergey Foss},
  journal= {arXiv preprint arXiv:1205.5793},
  year   = {2014}
}

Comments

17 pages

R2 v1 2026-06-21T21:09:42.644Z