Boundary non-crossing probabilities of Gaussian processes: sharp bounds and asymptotics

Abstract

We study boundary non-crossing probabilities Pf,u := P(∀ t∈ T\ Xt + f(t) u(t)) for continuous centered Gaussian process X indexed by some arbitrary compact separable metric space T. We obtain both upper and lower bounds for Pf,u. The bounds are matching in the sense that they lead to precise logarithmic asymptotics for the large-drift case Py f,u, y +∞, which are two-term approximations (up to o(y)). The asymptotics are formulated in terms of the solution f to the constrained optimization problem \|h\| HX , h∈ HX, h f in the reproducing kernel Hilbert space HX of X. Several applications of the results are further presented.