Parisian ruin probability for two-dimensional Brownian risk model

Abstract

Let (W1(s), W2(t)), s,t 0 be a bivariate Brownian motion with standard Brownian motion marginals and constant correlation ∈ (-1,1). Parisian ruin is defined as a classical ruin that happens over an extended period of time, the so-called time-in-red. We derive exact asymptotics for the non-simultaneous Parisian ruin of the company conditioned on the event of non-simultaneous ruin happening. We are interested in finding asymptotics of such problem as u ∞ and with the length of time-in-red being of order 1u2, where u represents initial capital for the companies. Approximation of this problem is of interest for the analysis of Parisian ruin probability in bivariate Brownian risk model, which is a standard way of defining prolonged ruin models in the financial markets.

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