广义交换期权定价

基于风险中性(等价鞅测度)定价理论和经典的Black-Scholes市场环境,我们给出了更一般情形下的欧式交换期权(ExchangeOption)封闭形式的解析定价公式,进而得出了欧式交换期权的价格公式、Black-Scholes期权定价公式.     

几何平均下的水平重置期权定价

针对重置期权的风险对冲△跳现象,研究了一种亚式特征的水平重置期权的定价问题.首先在BS模型下用股票的几何平均价格作为水平重置期权执行价格重置与否的统计量,然后运用测度变换和鞅定价方法得到了风险中性定价公式,最后利用风险中性定价公式得出风险对冲△值的显示解,改进了水平重置期权的部分已有结果.     

基于CEV扩散模型的领子期权定价

在等价鞅测度下,利用风险中性定价方法,推导出标的资产服从CEV扩散模型下领子期权的解析定价公式.针对公式特点,借助非中心χ²分布余函数近似算法提供了便于实际应用的数值模拟方法;并讨论了CEV模型中的参数r,q,δ依赖时间下定价公式的拓广形式.     

不完全市场下有违约风险的欧式期权定价

本文考虑不完全市场条件下,结合klein(1996)的有违约风险处理方法和Cochrane与Saá-Requejo(2000)的不完全市场处理方法给有违约风险的欧式期权定价,得到不完全市场下有违约风险欧式期权的一般化定价公式,进一步推导出一些特定欧式期权的定价公式,并指出这些公式均为本文公式的特例.     

随机利率情形下跳-扩散模型的未定权益定价

讨论Vasicek短期利率模型下,风险资产的价格过程服从跳-扩散过程的欧式未定权益定价问题,利用鞅方法得到了欧式看涨期权和看跌期权定价公式及平价关系,最后给出了基于风险资产支付连续红利收益的欧式期权定价公式.     

基于跳扩散过程的数据选择权定价

本文在风险中性原理下研究基于跳扩散过程的数据选择权定价问题,推导了标的资产价格服从跳扩散过程的数据选择权的定价公式。     

基于跳跃波动率的未定权益定价模型

讨论了具有随机波动率的未定权益定价问题,建立了两状态波动率的股票价格行为模型,在股票价格过程是连续过程、跳风险不可定价的假设下,推导出未定权益的定价公式.     

具有违约风险的欧式期权定价

本文允许随机利率与随机的对手公司负债,扩展了k le in(1996)的定价模型,运用结构化方法,得到有违约风险欧式期权的一般化定价公式,进一步推导出一些特定欧式期权的定价公式,并指出这些公式均为本文公式的特例。     

欧式复合期权的定价公式

本文根据风险中性定价原理,用较简单的数学方法推导出了股票欧式复合期权的定价公式。该公式和求解B lack-Scho les微分方程所得结果一致。     

随机利率下信息非完全时的风险债券定价

本文在结构化模型的框架下,运用远期鞅方法推导了随机利率时不完全信息的风险债券的定价公式,并分析了公式里的五项重要指标对风险债券价格的影响.     

随机利率下可分离交易可转换债券的鞅定价

从定量的角度分析了可分离式可转换债券的价值构成,并在服从Vasicek利率模型的随机利率下,利用Martingle Pricing方法推导出其定价公式.     

Assessing the cost of capital for longevity risk

The cost of capital is a key element of the embedded value methodology for the valuation of a life business. Further, under some solvency approaches (in particular, the Swiss Solvency Test and the developing Solvency 2 project) assessing the cost of capital constitutes a step in determining the required capital allocation.Whilst the cost of capital is usually meant as a reward for the risks encumbering a given life portfolio, in actuarial practice the relevant parameter has been traditionally chosen, at least to some extent, inconsistently with such risks. The adoption of market-consistent valuations has then been advocated to reach a common standard.A market-consistent value usually acknowledges a reward to shareholders’ capital as long as the market does, namely if the risk is systematic or undiversifiable. When dealing with a life annuity portfolio (or a pension plan), an important example of systematic risk is provided by the longevity risk, i.e. the risk of systematic deviations from the forecasted mortality trend. Hence, a market-consistent approach should provide appropriate valuation tools.In this paper we refer to a portfolio of immediate life annuities and we focus on longevity risk. Our purpose is to design a framework for a valuation of the portfolio which is market-consistent, and therefore based on a risk-neutral argument, while involving some of the basic items of a traditional valuation, viz best estimate future flows and allocated capital. This way, we try to reconcile the traditional with a market-consistent (or risk-neutral) approach. This allows us, in particular, to translate the results obtained under the risk-neutral approach in terms of a properly redefined embedded value.     

随机利率下有股利分配的可转换债券的鞅定价

从定量的角度分析了随机利率下有股利分配的可转换债券的价值构成, 并在股票价格服从对数正态分布的条件下, 利用Martingale Pricing方法推导出其定价公式.     

An extended Heath–Jarrow–Morton risk-neutral drift

Using a finite dimensional Hilbert space framework, this work proposes a new derivation of the HJM [D. Heath, R. Jarrow, A. Morton, Bond pricing and the term structure of interest rates: A new methodology for contingent claims valuation, Econometrica 60 (1992) 77–105] risk-neutral drift that takes into account nonzero instantaneous correlations between factors. The results obtained generalize the original HJM risk-neutral drift and provide an approach by which interest rate derivatives can be priced using functions of directly observable factors.     

可分离交易的可转换债券的鞅定价

从定量的角度分析了可分离交易可转换债券的价值构成,并在股票价格服从对数正态分布的条件下,利用Martingle Pricing方法推导出其定价公式.     

有跳-扩散违约风险的可转换债券的定价

本文研究在跳-扩散违约风险模型下可转换债券的定价问题,假定股票价格服从对数正态分布,利用Martingale Pricing方法推导出其定价公式.     

随机利率下服从指数O-U过程的可转换债券的鞅定价

从定量的角度分析了随机利率下有股利分配的可转换债券的价值构成,并在股价服从广义O-U过程的条件下,利用鞅定价方法推导出可转换债券的定价公式.     

Pricing and hedging in a single period market with random interval valued assets

In this article, a new financial market model, in which securities have random interval valued payoffs, is proposed. As an extension of traditional random market model, some concepts, such as robust arbitrage opportunities, risk-neutral pricing measures and robust replicative strategies, are given and discussed parallel to those in traditional market analysis. With these new concepts, problems of pricing and hedging are analyzed. It is shown that the requirement of no robust arbitrage opportunities is equivalent to the existence of risk-neutral pricing measures. Taking no robust arbitrage as the valuation principle, the problem of pricing a contingent claim with random interval valued payoff is discussed. All no robust arbitrage prices of the claim form an interval, whose endpoints can be got from the risk-neutral pricing measures or from robust replicative strategies.     

On the modelling of nested risk-neutral stochastic processes with applications in insurance

We propose a modelling framework for risk-neutral stochastic processes nested in a real-world stochastic process. The framework is important for insurers that deal with the valuation of embedded options and in particular at future points in time. We make use of the class of State Space Hidden Markov models for modelling the joint behaviour of the parameters of a risk-neutral model and the dynamics of option market instruments. This modelling concept enables us to perform non-linear estimation, forecasting and robust calibration. The proposed method is applied to the Heston model for which we find highly satisfactory results. We use the estimated Heston model to compute the required capital of an insurance company under Solvency II and we find large differences compared to a basic calibration method.