Abstract
This paper focuses on a stochastic differential game played between two insurance companies, a big one and a small one. In our model, the basic claim process is assumed to follow a Brownian motion with drift. Both of two insurance companies purchase the reinsurance, respectively. The big company has sufficient asset to invest in the risky asset which is described by the constant elasticity of variance (CEV) model and acquire new business like acting as a reinsurance company of other insurance companies, while the small company can invest in the risk-free asset and purchase reinsurance. The game studied here is zero-sum where there is a single exponential utility. The big company is trying to maximize the expected exponential utility of the terminal wealth to keep its advantage on surplus while simultaneously the small company is trying to minimize the same quantity to reduce its disadvantage. In this paper, we describe the Nash equilibrium of the game and prove a verification theorem for the exponential utility. By solving the corresponding Fleming-Bellman-Isaacs equations, we derive the optimal reinsurance and investment strategies. Furthermore, numerical examples are presented to show our results.
Highlights
Most insurance companies manage their business by means of reinsurance and investment, which are effective way to spread risk and make profit. erefore, these have inspired hundred researches
Another aspect worthy to be further explored is that the price processes of risky assets in most of literature about the optimal reinsurance and investment problems in frameworks of stochastic differential games are assumed to follow a geometric Brownian motion (GBM), which implies that the volatilities of risky assets are constant and deterministic
E big insurance company has more initial surplus than the small one, so the big company has sufficient asset to invest in the risky asset which is described by the constant elasticity of variance (CEV) model and acquire new business like acting as a reinsurance company of other insurance companies, while the small company can only invest in the risk-free asset and purchase reinsurance
Summary
Most insurance companies manage their business by means of reinsurance and investment, which are effective way to spread risk and make profit. erefore, these have inspired hundred researches. Investment plays a significant role in the insurance business, Mathematical Problems in Engineering especially for those big insurance companies who have enough ability to invest in the risky asset for more profits Another aspect worthy to be further explored is that the price processes of risky assets in most of literature about the optimal reinsurance and investment problems in frameworks of stochastic differential games are assumed to follow a geometric Brownian motion (GBM), which implies that the volatilities of risky assets are constant and deterministic. Liang et al [27] and Lin and Li [28] used the CEV model to study the proportional reinsurance and investment problem for an insurance company with the jump-diffusion risk model. Erefore, in this paper, we consider a stochastic differential game played between two insurance companies, a big one and a small one.
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