Machine Learning-powered Pricing of the Multidimensional Passport Option

Josef Teichmann, Hanna Wutte
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Abstract

Introduced in the late 90s, the passport option gives its holder the right to trade in a market and receive any positive gain in the resulting traded account at maturity. Pricing the option amounts to solving a stochastic control problem that for $d>1$ risky assets remains an open problem. Even in a correlated Black-Scholes (BS) market with $d=2$ risky assets, no optimal trading strategy has been derived in closed form. In this paper, we derive a discrete-time solution for multi-dimensional BS markets with uncorrelated assets. Moreover, inspired by the success of deep reinforcement learning in, e.g., board games, we propose two machine learning-powered approaches to pricing general options on a portfolio value in general markets. These approaches prove to be successful for pricing the passport option in one-dimensional and multi-dimensional uncorrelated BS markets.
多维护照选项的机器学习定价
护照期权于上世纪90年代末推出,它赋予持有者在市场上进行交易的权利,并在到期时从交易账户中获得任何正收益。期权定价相当于解决了一个随机控制问题,对于d>1美元的风险资产来说,这个问题仍然是一个悬而未决的问题。即使在具有$d=2$风险资产的相关布莱克-斯科尔斯(BS)市场中,也没有以封闭形式导出最优交易策略。本文导出了资产不相关的多维BS市场的离散时间解。此外,受深度强化学习在棋盘游戏等领域成功的启发,我们提出了两种基于机器学习的方法来对一般市场中的投资组合价值进行一般期权定价。这些方法在一维和多维不相关的BS市场上被证明是成功的护照期权定价。
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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