Simultaneous ruin probability for two-dimensional fractional Brownian motion risk process over discrete grid, with supplements

Abstract

This paper derives the asymptotic behavior of the following ruin probability P\∃ t ∈ G(δ):BH(t)-c1t>q1u,BH(t)-c2t>q2u\, \ \ \ u → ∞, where BH is a standard fractional Brownian motion, c1,q1,c2,q2>0 and G(δ) denotes a regular grid \0,δ, 2δ,...\ for some δ>0. The approximation depends on H, δ (only when H≤ 1/2) and the relations between parameters c1,q1,c2,q2.