基于神经网络的美式期权隐含信息提取

Shuaiqiang Liu, Álvaro Leitao, A. Borovykh, C. Oosterlee
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引用次数: 1

摘要

由于美式期权的早期行权区域形状复杂,且需要反复求解相应的数学问题,因此从观察到的期权价格中提取隐含信息(如波动率和股息)是一项具有挑战性的任务。我们将采用数据驱动的机器学习方法,以快速稳健的方式估计Black-Scholes隐含波动率和美国期权的股息收益率。为了确定隐含波动率,反函数由人工神经网络在有效的计算感兴趣域上近似,从而解耦了离线(训练)和在线(预测)阶段,从而消除了迭代过程的需要。在股息收益率未知的情况下,我们将反问题表述为校准问题,并同时确定隐含波动率和股息收益率。为此,引入了一种通用的鲁棒校准框架——校准神经网络(CaNN)来估计多个参数。研究表明,机器学习可以作为一种有效的数值技术,从美式期权中提取隐含信息,特别是在考虑由于负利率导致的多个早期操作区域时。
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On a Neural Network to Extract Implied Information from American Options
Extracting implied information, like volatility and dividend, from observed option prices is a challenging task when dealing with American options, because of the complex-shaped early-exercise regions and the computational costs to solve the corresponding mathematical problem repeatedly. We will employ a data-driven machine learning approach to estimate the Black-Scholes implied volatility and the dividend yield for American options in a fast and robust way. To determine the implied volatility, the inverse function is approximated by an artificial neural network on the effective computational domain of interest, which decouples the offline (training) and online (prediction) stages and thus eliminates the need for an iterative process. In the case of an unknown dividend yield, we formulate the inverse problem as a calibration problem and determine simultaneously the implied volatility and dividend yield. For this, a generic and robust calibration framework, the Calibration Neural Network (CaNN), is introduced to estimate multiple parameters. It is shown that machine learning can be used as an efficient numerical technique to extract implied information from American options, particularly when considering multiple early-exercise regions due to negative interest rates.
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来源期刊
Applied Mathematical Finance
Applied Mathematical Finance Economics, Econometrics and Finance-Finance
CiteScore
2.30
自引率
0.00%
发文量
6
期刊介绍: The journal encourages the confident use of applied mathematics and mathematical modelling in finance. The journal publishes papers on the following: •modelling of financial and economic primitives (interest rates, asset prices etc); •modelling market behaviour; •modelling market imperfections; •pricing of financial derivative securities; •hedging strategies; •numerical methods; •financial engineering.
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