On exceedance times for some processes with dependent increments

Abstract

Let Znn 0 be a random walk with a negative drift and i.i.d. increments with heavy-tailed distribution and let M=n 0Zn be its supremum. Asmussen & Kl\"uppelberg (1996) considered the behavior of the random walk given that M>x, for x large, and obtained a limit theorem, as x∞, for the distribution of the quadruple that includes the time =(x) to exceed level x, position Z at this time, position Z-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. The class of models include Markov-modulated models as particular cases. We also study fluid models, the Bj\"ork-Grandell risk process, give examples where the order of τ 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).