The Theory of Uncertaintism

IF 0.3 Q4 BUSINESS, FINANCE

Review of Pacific Basin Financial Markets and Policies Pub Date : 2021-09-01 DOI:10.1142/s0219091521500259

Tumellano Sebehela

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引用次数: 0

Abstract

The stock jumps of the underlying assets underpinning the Margrabe options have been studied by Cheang and Chiarella [Cheang, GH and Chiarella C (2011). Exchange options under jump-diffusion dynamics. Applied Mathematical Finance, 18(3), 245–276], Cheang and Garces [Cheang, GHL and Garces LPDM (2020). Representation of exchange option prices under stochastic volatility jump-diffusion dynamics. Quantitative Finance, 20(2), 291–310], Cufaro Petroni and Sabino [Cufaro Petroni, N and Sabino P (2020). Pricing exchange options with correlated jump diffusion processes. Quantitate Finance, 20(11), 1811–1823], and Ma et al. [Ma, Y, Pan D and Wang T (2020). Exchange options under clustered jump dynamics. Quantitative Finance, 20(6), 949–967]. Although the authors argue that they explored stock jumps under Hawkes processes, those processes are the Poisson process in their applications. Thus, they studied Hawkes processes in-between two assets while this study explores Hawkes process within any asset. Furthermore, the Poisson process can be flipped into Hawkes process and vice versa. In terms of hedging, this study uses specific Greeks (rho and phi) while some of the mentioned studies used other Greeks (Delta, Theta, Vega, and Gamma). Moreover, hedging is carried out under static and dynamic environments. The results illustrate that the jumpy Margrabe option can be extended to complex barrier option and waiting to invest option. In addition, hedging strategies are robust both under static and dynamic environments.

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不确定性理论

Cheang和Chiarella [Cheang, GH和Chiarella C(2011)]研究了支撑Margrabe期权的标的资产的股票跳涨。跳跃-扩散动力学下的交换期权。[2]张晓明，张晓明，张晓明，等。应用数学金融，18(3)，245-276]。随机波动率跳跃-扩散动力学下的交易所期权价格表示。Cufaro Petroni, N, Sabino P(2020).《数量金融》，20(2)，291-310。具有相关跳跃扩散过程的期权定价。马勇，潘东，王涛(2020).量化金融，20(11)，1811-1823。在集群跳转动态下交换选项。数量金融，20(6)，949-967。虽然作者认为他们在霍克斯过程下探索了股票的跳跃，但这些过程在他们的应用中是泊松过程。因此，他们研究了两个资产之间的Hawkes过程，而本研究探索了任何资产内部的Hawkes过程。此外，泊松过程可以转化为霍克斯过程，反之亦然。在对冲方面，本研究使用特定的希腊语(rho和phi)，而上述一些研究使用其他希腊语(Delta, Theta, Vega和Gamma)。此外，套期保值是在静态和动态环境下进行的。结果表明，跳跃马尔格拉贝期权可以推广到复杂障碍期权和等待投资期权。此外，对冲策略在静态和动态环境下都具有鲁棒性。

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

Review of Pacific Basin Financial Markets and Policies BUSINESS, FINANCE-

CiteScore

1.30

自引率

11.10%

发文量

期刊介绍： This journal concentrates on global interdisciplinary research in finance, economics and accounting. The major topics include: 1. Business, economic and financial relations among the Pacific rim countries. 2. Financial markets and industries. 3. Options and futures markets of the United States and other Pacific rim countries. 4. International accounting issues related to U.S. companies investing in Pacific rim countries. 5. The issue of and strategy for developing Tokyo, Taipei, Shanghai, Sydney, Seoul, Hong Kong, Singapore, Kuala Lumpur, Bangkok, Jakarta, and Manila as international or regional financial centers. 6. Global monetary and foreign exchange policy, and 7. Other high quality interdisciplinary research in global accounting, business, economics and finance.