Boundary Non-Crossings of Additive Wiener Fields

Abstract

Let Wi=\Wi(t), t∈ R+\, i=1,2 be two Wiener processes and W3=\W3(t), t∈ R+2\ be a two-parameter Brownian sheet, all three processes being mutually independent. We derive upper and lower bounds for the boundary non-crossing probability Pf=P\W1(t1)+W2(t2)+W3(t)+h(t)≤ u(t), t∈R+2\, where h, u: R+2→ R+ are two measurable functions. We show further that for large trend functions γ f>0 asymptotically when γ ∞ we have that Pγ f is the same as Pγ f where f is the projection of f on some closed convex set of the reproducing kernel Hilbert Space of W. It turns out that our approach is applicable also for the additive Brownian pillow.