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We study the background risk model under a various forms of dependence and some distribution classes of heavy tails. First, we study the asymptotic behavior of tail expectation of a portfolios with unequal heavytailedness, of non-random sums and randomly stopped sums, under some dependence structure which contains the independence as a special case. Further we investigate the asymptotic behavior of a pair of randomly weighted sums, generalizing the dependence structure among random vector components, our results contains the finite ruin probability in bi-dimensional discrete time risk model with unequal heavytailedness. Next, we carry out asymptotic analysis of the tail distortion risk measures in background risk model under various forms of dependence, with multivariate regularly varying risk distributions in each portfolio.
Konstantinides et al. (Sun,) studied this question.
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