带跳次分数布朗运动下亚式期权定价

研究次分数布朗运动环境下带跳跃的几何亚式期权定价问题,给出了标的资产遵循次分数跳-扩散过程下的几何平均亚式期权的定价公式.首先,将次分数公式推广到次分数跳-扩散的情况;其次,结合自融资交易策略得到次分数布朗运动下带跳的几何平均亚式期权满足的Black-Scholes偏微分方程;最后,利用变量替换法求解该偏微分方程得出亚式期权的定价公式.通过数值实验,可以看出赫斯特指数和跳跃强度对亚式期权价值有显著的影响.推广了一些已有的结论,扩展了期权定价相关理论.     

CEV跳-扩散模型中期权定价研究

考虑了CEV与Kou双指数跳-扩散组合模型中的期权定价问题.首先,运用Ito公式和期权定价的无套利原理,得到了模型下期权价格所满足的偏积-微分方程.然后,运用中心差分和Lagrange线性插值,分别对偏积-微分方程中的微分项和积分项进行离散化处理,再由Euler法,最终得了偏积-微分方程的有限差分格式,并且对差分方法的误差和收敛性进行了分析.最后数值实验验证了该算法是一个稳定且收敛的算法.     

跳扩散模型中亚式期权的定价

本文研究一类跳扩散模型中亚式期权的定价问题，得到了关于算术平均亚式期权的一个简单而统一的算法，并用偏微分方程的技巧将其定价问题归结为一个与路径依赖量无关的一维积分-微分方程的求解问题．     

随机波动率跳扩散模型的双币种任选期权定价

在随机波动率跳扩散框架下分析了双币种任选期权定价行为.运用偏微分方程,傅里叶逆变换等方法,得到双币种任选期权拟闭型定价公式.最后运用数值模拟,分析了跳跃波动对期权价格影响.     

随机利率下服从分数跳-扩散过程的回望期权定价

文章主要研究分数CIR利率模型下,标的资产股票价格服从分数跳-扩散过程的欧式回望期权定价问题.利用无套利原理和分数It公式,建立期权定价模型,得到了期权价格所满足的偏微分方程.并利用有限差分方法,给出了微分方程隐式格式的数值解,最后通过数值实验验证了该方法的有效性,推广了已有的回望期权定价理论.     

非仿射随机波动率跳扩散模型的利差期权定价

在两标的资产价格满足一类随机利率、随机波动率及跳跃均存在于资产价格和波动率的非仿射跳扩散模型下考察了利差期权的定价.首先,利用泰勒公式将非线性微分方程线性化,得到了两标的资产对数价格的近似联合密度特征函数;然后,使用Fourier逆变换等方法,获得了利差期权定价理论的半封闭公式,并将其推广到价差期权的定价.最后,通过数值实验,表明非仿射随机波动率跳扩散的利差期权定价模型比仿射随机波动率模型具有更高的精确性,并且扩散波动和跳跃波动对期权价格影响显著.     

跳扩散模型中的测度变换与期权定价

本文研究在跳扩散模型中概率测度的变换对于期权定价的影响．通过选取不同的记价单位以及相应的概率测度，简化了期权定价中一些复杂的理论，得到了在具有随机利率的跳扩散模型中欧式期权的定价公式以及关于跳扩散模型中交换期权、亚式期权等新型期权的定性、定解性质．     

分数布朗运动下几何平均亚式权证的定价

假设股票价格变化过程服从几何分数布朗运动,建立了分数布朗运动下的亚式期权定价模型.利用分数-It-公式,推导出分数布朗运动下亚式期权的价值所满足的含有三个变量偏微分方程.然后,引进适当的组合变量,将其定解问题转化为一个与路径无关的一维微分方程问题.进一步通过随机偏微分方程方法求解出分数布朗运动下亚式期权的定价公式.最后利用权证定价原理对稀释效用做出调整后,得到分数布朗运动下亚式股本权证定价公式.<正>~~     

双指数跳扩散模型的美式二值期权定价

在股价满足红利连续支付的双指数跳扩散模型下,研究美式二值现金-无值看涨期权的定价问题.通过分解方法将其定价转化成求一个对应的永久美式期权价格和一个Cauchy问题的解,从而得到定价表达式.最后给出一个计算实例.     

跳-扩散价格过程下有交易成本的期权定价研究

Black-Scholes模型成功解决了完全市场下的欧式期权定价问题.研究在不完全市场下的一类期权定价问题,即在假设交易过程有交易成本且标的资产价格服从跳-扩散过程下,推导出了在该模型下期权价格所满足的微分方程.     

一类具有随机利率的跳扩散模型的期权定价

假定股票价格的跳过程为比Po isson过程更一般的跳过程一类特殊的更新过程,在风险中性的假设下,推导出了具有随机利率的跳扩散模型的欧式期权定价公式.从而推广了文[3]的结果.     

基于跳扩散过程的欧式交换期权定价

考虑了股票价格服从带时滞泊松跳的跳扩散模型的欧式交换期权定价问题,运用无套利理论推导出期权价值微分方程,利用变换计价单位的方法,得到交换期权的显示定价公式.     

带固定比例交易费率的跳扩散欧式期权的定价

考虑市场存在交易费率的跳扩散欧式期权的定价问题.由于交易费的存在使得传统的对冲方法不适用,我们将该问题转化为两元的随机控制问题.证明了带固定比例交易费率的跳扩散欧式期权的价格是对应的积分微分不等方程的约束粘性解,并通过马尔科夫链对变分问题进行离散,证明了在粘性意义下离散方法的收敛性.最后给出了数值结果.     

Incorporating boundary conditions in a stochastic volatility model for the numerical approximation of bond prices

In this paper, we consider a two-factor interest rate model with stochastic volatility, and we assume that the instantaneous interest rate follows a jump-diffusion process. In this kind of problems, a two-dimensional partial integro-differential equation is derived for the values of zero-coupon bonds. To apply standard numerical methods to this equation, it is customary to consider a bounded domain and incorporate suitable boundary conditions. However, for these two-dimensional interest rate models, there are not well-known boundary conditions, in general. Here, in order to approximate bond prices, we propose new boundary conditions, which maintain the discount function property of the zero-coupon bond price. Then, we illustrate the numerical approximation of the corresponding boundary value problem by means of an alternative direction implicit method, which has been already applied for pricing options. We test these boundary conditions with several interest rate pricing models.     

双指数跳扩散模型下远期生效期权的定价

用双指数跳扩散过程来刻画风险资产的价格,给出了远期生效期权的定价公式.将远期生效期期权的价格转化为两个数学期望的乘积,利用指数分布的性质和全期望公式给出远期生效期权的定价公式.     

Numerical valuation of options under Kou's model

Numerical methods are developed for pricing European and American options under Kou's jump-diffusion model which assumes the price of the underlying asset to behave like a geometrical Brownian motion with a drift and jumps whose size is log-double-exponentially distributed. The price of a European option is given by a partial integro-differential equation (PIDE) while American options lead to a linear complementarity problem (LCP) with the same operator. Spatial differential operators are discretized using finite differences on nonuniform grids and time stepping is performed using the implicit Rannacher scheme. For the evaluation of the integral term easy to implement recursion formulas are derived which have optimal computational cost. When pricing European options the resulting dense linear systems are solved using a stationary iteration. Also for pricing American options similar iterations can be employed. A numerical experiment demonstrates that the described method is very efficient as accurate option prices can be computed in a few milliseconds on a PC. (© 2008 WILEY-VCH Verlag GmbH & Co. KGaA, Weinheim)     

Pricing catastrophe options with counterparty credit risk in a reduced form model

In this paper, we study the price of catastrophe options with counterparty credit risk in a reduced form model. We assume that the loss process is generated by a doubly stochastic Poisson process, the share price process is modeled through a jump-diffusion process which is correlated to the loss process, the interest rate process and the default intensity process are modeled through the Vasicek model. We derive the closed form formulae for pricing catastrophe options in a reduced form model. Furthermore, we make some numerical analysis on the explicit formulae.     

PIDE and Solution Related to Pricing of Lévy Driven Arithmetic Type Floating Asian Options

We propose a stochastic model to develop a pricing partial integro-differential equation (PIDE) and its Fourier transform expression for floating Asian options based on the Itô-Lévy calculus. The stock price is driven by a class of infinite activity Lévy processes leading to the market inherently incomplete, and dynamic hedging is no longer risk free. We first develop a PIDE for floating Asian options, and apply the Fourier transform to derive a pricing expression. Our main contribution is to develop a PIDE with its closed form pricing expression for the contract. The procedure is easy to implement for all class of Lévy processes. Finally, the model is calibrated with the market data and its accuracy is presented.     

A fast numerical approach to option pricing with stochastic interest rate,stochastic volatility and double jumps

This study proposes a pricing model through allowing for stochastic interest rate and stochastic volatility in the double exponential jump-diffusion setting. The characteristic function of the proposed model is then derived. Fast numerical solutions for European call and put options pricing based on characteristic function and fast Fourier transform (FFT) technique are developed. Simulations show that our numerical technique is accurate, fast and easy to implement, the proposed model is suitable for modeling long-time real-market changes. The model and the proposed option pricing method are useful for empirical analysis of asset returns and risk management in firms.     

双跳-扩散过程下的脆弱期权定价

本文考虑含有交易对手违约风险的衍生产品的定价,以公司价值信用风险模型为基础,在标的资产价格和公司价值均服从跳-扩散过程的情况下,运用结构化的方法对脆弱期权定价进行建模,建立了双跳-扩散过程下的脆弱期权定价模型,分别在公司负债固定和随机的情况下推导出了脆弱期权的定价公式.