Semi-analytic pricing of American options in some time-dependent jump-diffusion models

Andrey Itkin
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Abstract

In this paper we propose a semi-analytic approach to pricing American options for some time-dependent jump-diffusions models. The idea of the method is to further generalize our approach developed for pricing barrier, [Itkin et al., 2021], and American, [Carr and Itkin, 2021; Itkin and Muravey, 2023], options in various time-dependent one factor and even stochastic volatility models. Our approach i) allows arbitrary dependencies of the model parameters on time; ii) reduces solution of the pricing problem for American options to a simpler problem of solving an algebraic nonlinear equation for the exercise boundary and a linear Fredholm-Volterra equation for the the option price; iii) the options Greeks solve a similar Fredholm-Volterra linear equation obtained by just differentiating Eq. (25) by the required parameter.
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时变跳跃-扩散模型下美式期权的半解析定价
本文针对一些时变跳跃扩散模型,提出了一种求解美式期权定价的半解析方法。该方法的思想是进一步推广我们为定价障碍(Itkin et al.,2021)和美国(Carr and Itkin, 2021;Itkin and Muravey, 2023],各种随时间变化的单因素甚至随机波动模型中的选项。我们的方法i)允许模型参数对时间的任意依赖;ii)将美式期权定价问题的求解简化为求解求解求解行使边界的代数非线性方程和求解期权价格的线性Fredholm-Volterra方程的问题;iii)希腊人解出一个类似的Fredholm-Volterra线性方程,只需将Eq.(25)微分即可得到所需参数。
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