Extremal behaviour of hitting a cone by correlated Brownian motion with drift

Abstract

This paper derives an exact asymptotic expression for \[ Pxu\∃t0 X(t)- μt∈ U \, \ \ as\ \ u∞, \] where X(t)=(X1(t),…,Xd(t)),t0 is a correlated d-dimensional Brownian motion starting at the point xu=-αu with α∈ Rd, μ ∈ Rd and U=Πi=1d [0,∞). The derived asymptotics depends on the solution of an underlying multidimensional quadratic optimization problem with constraints, which leads in some cases to dimension-reduction of the considered problem. Complementary, we study asymptotic distribution of the conditional first passage time to U, which depends on the dimension-reduction phenomena.