Sample path properties of reflected Gaussian processes

Abstract

We consider a stationary queueing process QX fed by a centered Gaussian process X with stationary increments and variance function satisfying classical regularity conditions. A criterion when, for a given function f, P (QX(t) > f(t)\, i.o.) equals 0 or 1 is provided. Furthermore, an Erd\"os-R\'ev\'esz type law of the iterated logarithm is proven for the last passage time (t) = \s:0 s t, QX(s) f(s)\. Both of these findings extend previously known results that were only available for the case when X is a fractional Brownian motion.