On the passage times of self-similar Gaussian processes on curved boundaries

Abstract

Let Tc,β denote the smallest t1 that a continuous, self-similar Gaussian process with self-similarity index α>0 moves at least c tβ units. We prove that: (i) If β>α, then Tc,β=∞ with positive probability; (ii) If β<α and X is strongly locally nondeterministic in the sense of Pitt (1978), then Tc,β has moments of all order; and (iii) If β=α and X is strongly locally nondeterministic in the sense of Pitt (1978), then there exists a continuous, strictly decreasing function λ:(0\,,∞)(0\,,∞) such that E(Tc,βμ) is finite when 0<μ<λ(c) and infinite when μ>λ(c). Together these results extend a celebrated theorem of Breiman (1967) and Shepp (1967) for passage times of a Brownian motion on the critical square-root boundary. We briefly discuss two examples: One about fractional Brownian motion, and another about a family of linear stochastic partial differential equations.