Optimal investment and reinsurance of an insurer with model uncertainty

We introduce a novel approach to optimal investment–reinsurance problems of an insurance company facing model uncertainty via a game theoretic approach. The insurance company invests in a capital market index whose dynamics follow a geometric Brownian motion. The risk process of the company is governed by either a compound Poisson process or its diffusion approximation. The company can also transfer a certain proportion of the insurance risk to a reinsurance company by purchasing reinsurance. The optimal investment–reinsurance problems with model uncertainty are formulated as two-player, zero-sum, stochastic differential games between the insurance company and the market. We provide verification theorems for the Hamilton–Jacobi–Bellman–Isaacs (HJBI) solutions to the optimal investment–reinsurance problems and derive closed-form solutions to the problems.     

A simplified expression of the Shapley function for fuzzy game

In this paper, a simplified expression of the Shapley function for games with fuzzy coalition is proposed, which can be regarded as the generalization of Shapley functions defined in some particular games with fuzzy coalition. The simplified expression of the Shapley function is compared with two definitions established by Butnariu, Tsurumi et al. A conclusion is drawn that the simplified expression of the Shapley function is equivalent to Butnariu’s definition when characteristic function is a game with proportional values, and is equivalent to Tsurumi’s definition when characteristic function is a game with Choquet integral forms. Furthermore, from an angle of interaction between two participation levels, the properties of the two games defined by Butnariu and Tsurumi are respectively studied.     

A game theory approach in seller–buyer supply chain

In this paper, several seller–buyer supply chain models are proposed which incorporate both cost factors as well as elements of competition and cooperation between seller and buyer. We assume that unit marketing expenditure and unit price charged by the buyer influence the demand of the product being sold. The relationships between seller and buyer will be modeled by non-cooperative and cooperative games, respectively. The non-cooperative game is based on the Stackelberg strategy solution concept, where we consider separately the case when the seller is the leader (Seller-Stackelberg) and also when the buyer is the leader (Buyer-Stackelberg). Pareto efficient solutions will be provided for the cooperative game model. Numerical examples presented in this paper, including sensitivity analysis of some key parameters, will compare the results between different models considered.     

On a differential game in a nondamped distributed system

We study a differential game of approach in a system whose dynamics is described by a Sobolev‐type second‐order operator differential equation in Hilbert spaces. Solutions of the equation are represented by cosine and sine operator functions. To obtain solvability conditions of the game problem, we use support functionals of two sets, which defined by the behaviors of pursuer and evader. The results are applied to the investigation of conflicted‐controlled dynamics of bending waves in a rod.     

创新网络合作密度影响因素及其仿真分析

合作创新模式使得创新主体之间构成具有拓扑结构特性的创新网络,创新主体合作行为会影响创新网络的可持续发展。为探究不同影响因素作用下创新网络合作密度的变化,基于演化博弈理论和BA无标度网络理论,运用仿真方法,分析了网络规模、聚类系数、偏好性仿真、利益分配对创新网络合作密度的影响。结果表明:小规模的创新网络具有较低的聚类系数有利于网络合作密度的提升,大规模的创新网络具有较高的聚类系数有利于网络合作密度的提升;无论是大规模还是小规模创新网络,适度的偏好性模仿均能促进网络合作密度的提升;对于利益分配而言,无论是大规模还是小规模的创新网络,按劳分配是提升网络合作密度的最佳利益分配形式。     

环境规制、环境研发与绿色技术进步

为鼓励和引导绿色技术发展,驱动预防性技术和处理性技术协同进步,有必要开发环境规制的绿色技术进步导向功能,并探究其传导机理。论文通过建立双寡头同时博弈模型对环境规制、环境研发与绿色技术进步进行关联分析。研究表明:环境研发是环境规制推动绿色技术进步的重要传导路径;环境补贴力度会显著影响环境规制政策组合的技术进步效果;绿色技术进步导向的环境规制的政策组合存在一个普适性较强的应用策略;环境税和环境补贴的规制政策组合能够有效增进社会福利,具体表现为通过污染预防技术和污染处理技术的协同进步带来的产量增加、生产成本减少、污染产生量减少以及污染处理量增加。     

Regularity of Nash payoffs of Markovian nonzero-sum stochastic differential games

In this paper we deal with the problem of existence of a smooth solution of the Hamilton–Jacobi–Bellman–Isaacs (HJBI for short) system of equations associated with nonzero-sum stochastic differential games. We consider the problem in unbounded domains either in the case of continuous generators or for discontinuous ones. In each case we show the existence of a smooth solution of the system. As a consequence, we show that the game has smooth Nash payoffs which are given by means of the solution of the HJBI system and the stochastic process which governs the dynamic of the controlled system.     

专业零售商与厂家直售商的多渠道供应价格博弈的混沌动力学研究

在零售市场,专业零售商与厂家直售商的价格竞争日益突起,再次背景下构建了专业零售商和厂家直售商组成的多渠道供应链价格博弈模型。利用管理学、经济学以及混沌动力学有关理论,对多渠道供应链中各渠道间长期价格博弈的动态演化过程进行理论验证和数据仿真,研究了专业零售商和厂家直售商的价格决策变量的变化给市场带来的影响。研究表明,双方价格决策变量的不断增加,市场从稳定进入混沌无序状态。采用调整参数可以对混沌进行有效的控制,研究结果具有较好的理论和实际应用价值。     

不透明销售的顾客退货政策选择

本文探讨从事不透明销售的零售商对顾客退货政策的选择问题。分别针对零售商垄断和竞争两种市场情况,建立不透明零售商与其它供应链成员(制造商或普通零售商)之间的博弈模型,获得唯一均衡解;对均衡结果进行结构化分析,给出不透明销售方式下采用全额退款政策的判别条件;针对均衡结果,分析零售商垄断情况下产品不透明参数的最优设计,以及零售商竞争情况下的市场分化情况;鉴于净残值参数在退货政策选择中的决定性作用,本文进一步探讨了净残值为正时全额退款政策对各参与方利润及产品需求和价格的影响,分析了净残值在其中的作用机理。本研究能够为不透明零售商制定退货政策和价格以及其它供应链成员制定相关决策提供支持。     

双重委托-代理理论在税收流失中的应用

本文研究了我国国税局和地税局在税收征管上的合作问题。首次应用双重委托一代理理论对该问题进行了经济分析。研究发现,国税局和地税局在税收征收和税收监管上完全合作时,相对而言,能最大化它们的总效用;而当国税局和地税局只在税收监管上合作时,税收征收上的“正外部性”将导致相对“过剩”的监管;最后,如果国税局和地税局完全不合作时,监管上的“搭便车”效应是影响博弈结果的主导因素。研究结果有一定的现实意义。