Asymptotic of Non-Crossings probability of Additive Wiener Fields

Abstract

Let Wi=\Wi(ti), ti∈ +\, i=1,2,…,d are independent Wiener processes. W=\W(t),t∈ +d\ be the additive Wiener field define as the sum of Wi. For any trend f in (the reproducing kernel Hilbert Space of W), we derive upper and lower bounds for the boundary non-crossing probability Pf=P\Σi=1dWi(ti) +f(t)≤ u(t), t∈+d\, where u: +d→ + is a measurable function. Furthermore, for large trend functions γ f>0, we show that the asymptotically relation Pγ f Pγ f as γ , where f is the projection of f on some closed convex subset of .