双分式随机波动率和跳跃下的远期起始期权定价

IF 4.3 3区 材料科学 Q1 ENGINEERING, ELECTRICAL & ELECTRONIC
Sumei Zhang, Haiyang Xiao, Hongquan Yong
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引用次数: 0

摘要

本文旨在为双分数随机波动率混合指数跳跃扩散模型下的远期起始期权提供一种有效的定 价方法。远期起始期权的价值用对数收益率的远期特征函数的期望值来表示。为了得到前向特征函数,我们通过引入两个小扰动参数,用半鞅模型来近似定价模型。然后,我们将前向特征函数重写为比例特征函数的条件期望,比例特征函数用经典 PDE 的解来表示。利用近似模型的仿射结构,我们得到了 PDE 的解。基于推导出的远期特征函数和傅立叶变换技术,我们开发了一种远期起始期权的定价算法。为了进行比较,我们还开发了一种评估远期起始期权的模拟方案。数值结果表明,所提出的定价算法是有效的。对八个模型的详尽对比实验表明,分式布朗运动、混合指数跳跃和第二波动率分量对远期起始期权价格的影响是显著的,尤其是第二分式波动率是在分式布朗运动框架下对远期起始期权进行精确定价的必要条件。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Forward Starting Option Pricing under Double Fractional Stochastic Volatilities and Jumps
This paper aims to provide an effective method for pricing forward starting options under the double fractional stochastic volatilities mixed-exponential jump-diffusion model. The value of a forward starting option is expressed in terms of the expectation of the forward characteristic function of log return. To obtain the forward characteristic function, we approximate the pricing model with a semimartingale by introducing two small perturbed parameters. Then, we rewrite the forward characteristic function as a conditional expectation of the proportion characteristic function which is expressed in terms of the solution to a classic PDE. With the affine structure of the approximate model, we obtain the solution to the PDE. Based on the derived forward characteristic function and the Fourier transform technique, we develop a pricing algorithm for forward starting options. For comparison, we also develop a simulation scheme for evaluating forward starting options. The numerical results demonstrate that the proposed pricing algorithm is effective. Exhaustive comparative experiments on eight models show that the effects of fractional Brownian motion, mixed-exponential jump, and the second volatility component on forward starting option prices are significant, and especially, the second fractional volatility is necessary to price accurately forward starting options under the framework of fractional Brownian motion.
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来源期刊
CiteScore
7.20
自引率
4.30%
发文量
567
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