On the tail asymptotics of the area swept under the Brownian storage graph

Abstract

In this paper, the area swept under the workload graph is analyzed: with \Q(t) : t0\ denoting the stationary workload process, the asymptotic behavior of \[πT(u)(u):=P(∫0 T(u)Q(r)\,dr>u)\] is analyzed. Focusing on regulated Brownian motion, first the exact asymptotics of πT(u)(u) are given for the case that T(u) grows slower than u, and then logarithmic asymptotics for (i) T(u)=Tu (relying on sample-path large deviations), and (ii) u=o(T(u)) but T(u)=o(u). Finally, the Laplace transform of the residual busy period are given in terms of the Airy function.