TY - JOUR AB - Purpose The purpose of this paper is to build a phase-type risk model with stochastic return on investment and random observation periods to characterize the ruin quantities under which the insurance company may take effective investment strategies to avoid bankruptcy.Design/methodology/approach By the Markov property and Ito’s formula, this paper derives the integro-differential equations in which the interclaim times follow a phase-type distribution. Using the sinc method, this paper obtains the approximate solutions of the expected discounted penalty function. The numerical examples are given to verify the robustness of the proposed sinc method.Findings This paper discloses the relationship between the investment strategy and initial surplus level. The insurance company with a high initial surplus level prefers high risk portfolios to earn more profit. Contrarily, the insurance company would invest low risk portfolios to avoid bankruptcy. In addition, this paper shows that a short observation period would bring higher ruin probability.Originality/value The risk model is distinct in that a phase-type risk model is constructed with stochastic return on investment and random observation periods. These considerations in the risk model are in sharp contrast to the setting in which the stochastic return on investment is observed continuously. In practice, the insurance company only can periodically observe the surplus level to check the balance of the book. This setting, therefore, is difficult to adopt. This paper develops a sinc method to solve the approximate solutions of the expected discounted penalty function. VL - 47 IS - 7 SN - 0368-492X DO - 10.1108/K-05-2017-0153 UR - https://doi.org/10.1108/K-05-2017-0153 AU - Zhuo Wenyan AU - Yang Honglin AU - Chen Xu PY - 2018 Y1 - 2018/01/01 TI - Expected discounted penalty function for a phase-type risk model with stochastic return on investment and random observation periods T2 - Kybernetes PB - Emerald Publishing Limited SP - 1420 EP - 1434 Y2 - 2024/05/06 ER -