Two-dimensional Brownian risk model for cumulative Parisian ruin probability

Abstract

Let (W1(s), W2(t)), s,t 0 be a bivariate Brownian motion with standard Brownian motion marginals and constant correlation ∈ (-1,1). In this contribution we derive precise approximations for cumulative Parisian ruin conditioned on the occurrence of the ruin of the aforementioned two-dimensional Brownian motion, i.e. P(arrayccc∫[0,1] 1(W1*(s)>u)ds>H1(u) \\ ∫[0,1] 1(W2*(t)>au)dt>H2(u)array|∃v,w ∈ [0,1]arrayccc W1(v)-c1v>u \\ W2(w)-c2w>au array). We study the asymptotics for specific functions H(u) for u being proportional to initial position of the Brownian motion, which determines how long does the process need to spend over the barrier.