Ruin Probability Approximation for Bidimensional Brownian Risk Model with Tax
Abstract
Let B(t)=(B1(t), B2(t)), t≥ 0 be a two-dimensional Brownian motion with independent components and define the γ-reflected process X(t)=(X1(t),X2(t))=(B1(t)-c1t-γ1∈fs1∈[0,t](B1(s1)-c1s1),B2(t)-c2t-γ2∈fs2∈[0,t](B2(s2)-c2s2)), with given finite constants c1,c2 and γ1,γ2∈[0,2). The goal of this paper is to derive the asymptotics of the ruin probability P\∃t∈[0,T]: X1(t)>u,X2(t)>au\ as u∞ and T>0.
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