Risk process with a periodic reinsurance: Choosing an optimal reinsurance strategy of a total risk


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Abstract

In this work, we study the optimal risk sharing problem for an insurer between himself and a reinsurer in a dynamical insurance model known as the Kramer–Lundberg risk process, which, unlike known models, models not per claim reinsurance but rather periodic reinsurance of damages over a given time interval. Here we take into account a natural upper bound on the risk taken by the reinsurer. We solve optimal control problems on an infinite time interval for mean-variance optimality criteria: a linear utility functional and a stationary variation coefficient. We show that optimal reinsurance belongs to the class of total risk reinsurances. We establish that the most profitable reinsurance is the stop-loss reinsurance with an upper limit. We find equations for the values of parameters in optimal reinsurance strategies.

About the authors

A. Y. Golubin

National Research University Higher School of Economics; Center of Information Technologies in Design of the Russian Academy of Sciences

Author for correspondence.
Email: agolubin@hse.ru
Russian Federation, Moscow; Odintsovo, Moscow Regions

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