Structural properties of Gerber-Shiu functions in dependent Sparre Andersen models |
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Authors: | Eric CK Cheung |
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Institution: | Department of Statistics and Actuarial Science, University of Waterloo, 200 University Avenue West, Waterloo, Canada |
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Abstract: | The structure of various Gerber-Shiu functions in Sparre Andersen models allowing for possible dependence between claim sizes and interclaim times is examined. The penalty function is assumed to depend on some or all of the surplus immediately prior to ruin, the deficit at ruin, the minimum surplus before ruin, and the surplus immediately after the second last claim before ruin. Defective joint and marginal distributions involving these quantities are derived. Many of the properties in the Sparre Andersen model without dependence are seen to hold in the present model as well. A discussion of Lundberg’s fundamental equation and the generalized adjustment coefficient is given, and the connection to a defective renewal equation is considered. The usual Sparre Andersen model without dependence is also discussed, and in particular the case with exponential claim sizes is considered. |
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Keywords: | Defective renewal equation Compound geometric distribution Ladder height Lundberg&rsquo s fundamental equation Generalized adjustment coefficient Cramer&rsquo s asymptotic ruin formula Esscher transform Last interclaim time NWU NBU |
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