American option pricing using generalised stochastic hybrid systems

Evelyn Buckwar, Sascha Desmettre, Agnes Mallinger, Amira Meddah
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Abstract

This paper presents a novel approach to pricing American options using piecewise diffusion Markov processes (PDifMPs), a type of generalised stochastic hybrid system that integrates continuous dynamics with discrete jump processes. Standard models often rely on constant drift and volatility assumptions, which limits their ability to accurately capture the complex and erratic nature of financial markets. By incorporating PDifMPs, our method accounts for sudden market fluctuations, providing a more realistic model of asset price dynamics. We benchmark our approach with the Longstaff-Schwartz algorithm, both in its original form and modified to include PDifMP asset price trajectories. Numerical simulations demonstrate that our PDifMP-based method not only provides a more accurate reflection of market behaviour but also offers practical advantages in terms of computational efficiency. The results suggest that PDifMPs can significantly improve the predictive accuracy of American options pricing by more closely aligning with the stochastic volatility and jumps observed in real financial markets.
利用广义随机混合系统进行美式期权定价
本文提出了一种利用片式扩散马尔可夫过程(PDifMPs)为美式期权定价的新方法,PDifMPs 是一种广义随机混合系统,它将连续动力学与离散跳跃过程整合在一起。标准模型通常依赖于恒定漂移和波动性假设,这就限制了它们准确捕捉金融市场复杂性和随机性的能力。通过纳入 PDifMPs,我们的方法考虑到了市场的突然波动,为资产价格动态提供了一个更真实的模型。我们用 Longstaff-Schwartz 算法对我们的方法进行了基准测试,既包括其原始形式,也包括为纳入 PDifMP 资产价格轨迹而进行的修改。数值模拟证明,我们基于 PDifMP 的方法不仅能更准确地反映市场行为,而且在计算效率方面也具有实际优势。结果表明,PDifMP 与实际金融市场中观察到的随机波动性和跳跃性更接近,可以显著提高美式期权定价的预测准确性。
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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