Analytically pricing volatility options and capped/floored volatility swaps with nonlinear payoffs in discrete observation case under the Merton jump-diffusion model driven by a nonhomogeneous Poisson process

IF 4.3 3区 材料科学 Q1 ENGINEERING, ELECTRICAL & ELECTRONIC
Sanae Rujivan
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Abstract

In this paper, we introduce novel analytical solutions for valuating volatility derivatives, including volatility options and capped/floored volatility swaps, employing discrete sampling within the framework of the Merton jump-diffusion model, which is driven by a nonhomogeneous Poisson process. The absence of a comprehensive understanding of the probability distribution characterizing the realized variance has historically impeded the development of a robust analytical valuation approach for such instruments. Through the application of the cumulative distribution function of the realized variance conditional on Poisson jumps, we have derived explicit expectations for the derivative payoffs articulated as functions of the extremum values of the square root of the realized variance. We delineate precise pricing structures for an array of instruments, encompassing variance and volatility swaps, variance and volatility options, and their respective capped and floored variations, alongside establishing put-call parity and relationships for capped and floored positions. Complementing the theoretical advancements, we substantiate the practical efficacy and precision of our solutions via Monte Carlo simulations, articulated through multiple numerical examples. Conclusively, our analysis extends to the quantification of jump impacts on the fair strike prices of volatility derivatives with nonlinear payoffs, facilitated by our analytic pricing expressions.

在非均质泊松过程驱动的默顿跳跃-扩散模型下,离散观测情况下具有非线性回报的波动率期权和上限/下限波动率掉期的分析定价方法
在本文中,我们介绍了对波动率衍生品(包括波动率期权和封顶/浮动波动率互换)进行估值的新型分析解决方案,在默顿跳跃扩散模型的框架内采用离散采样,该模型由非均质泊松过程驱动。由于缺乏对已实现方差概率分布特征的全面了解,一直以来都阻碍着此类工具稳健分析估值方法的发展。通过应用泊松跃迁条件下已实现方差的累积分布函数,我们推导出了明确的衍生品报酬率期望值,并将其表述为已实现方差平方根极值的函数。我们划定了一系列工具的精确定价结构,包括方差和波动率掉期、方差和波动率期权及其各自的上限和下限变体,同时还建立了看跌-看涨平价以及上限和下限头寸的关系。作为对理论进展的补充,我们通过蒙特卡罗模拟,并通过多个数字示例,证实了我们解决方案的实际功效和精确性。最后,我们的分析扩展到量化跳跃对具有非线性报酬率的波动性衍生品公允执行价格的影响,而我们的分析定价表达式则为其提供了便利。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
7.20
自引率
4.30%
发文量
567
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