Unbiased Deep Solvers for Linear Parametric PDEs

Q3 Mathematics

Applied Mathematical Finance Pub Date : 2018-10-11 DOI:10.1080/1350486X.2022.2030773

Marc Sabate Vidales, D. Šiška, L. Szpruch

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引用次数: 3

Abstract

We develop several deep learning algorithms for approximating families of parametric PDE solutions. The proposed algorithms approximate solutions together with their gradients, which in the context of mathematical finance means that the derivative prices and hedging strategies are computed simultaneously. Having approximated the gradient of the solution, one can combine it with a Monte Carlo simulation to remove the bias in the deep network approximation of the PDE solution (derivative price). This is achieved by leveraging the Martingale Representation Theorem and combining the Monte Carlo simulation with the neural network. The resulting algorithm is robust with respect to the quality of the neural network approximation and consequently can be used as a black box in case only limited a-priori information about the underlying problem is available. We believe this is important as neural network-based algorithms often require fair amount of tuning to produce satisfactory results. The methods are empirically shown to work for high-dimensional problems (e.g., 100 dimensions). We provide diagnostics that shed light on appropriate network architectures.

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线性参数偏微分方程的无偏深度解

我们开发了几种用于逼近参数PDE解族的深度学习算法。所提出的算法连同其梯度近似解，在数学金融的背景下，这意味着衍生品价格和对冲策略是同时计算的。在近似解的梯度之后，可以将其与蒙特卡罗模拟相结合，以消除PDE解(导数价格)的深度网络近似中的偏差。这是通过利用鞅表示定理并将蒙特卡罗模拟与神经网络相结合来实现的。所得到的算法在神经网络近似的质量方面是鲁棒的，因此在只有有限的先验信息可用的情况下，可以用作黑盒。我们认为这很重要，因为基于神经网络的算法通常需要相当数量的调优才能产生令人满意的结果。经验表明，这些方法适用于高维问题(例如，100维)。我们提供诊断，阐明适当的网络架构。

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

Applied Mathematical Finance Economics, Econometrics and Finance-Finance

CiteScore

2.30

自引率

0.00%

发文量

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.