Deep Learning of Transition Probability Densities for Stochastic Asset Models with Applications in Option Pricing
成果类型:
Article
署名作者:
Su, Haozhe; Tretyakov, M., V; Newton, David P.
署名单位:
University of Nottingham; Nottingham Trent University; University of Nottingham; University of Bath
刊物名称:
MANAGEMENT SCIENCE
ISSN/ISSBN:
0025-1909
DOI:
10.1287/mnsc.2022.01448
发表日期:
2025
关键词:
deep learning
transition probability density
parametric PDEs
Neural Networks
option pricing
摘要:
Transition probability density functions (TPDFs) are fundamental to computational finance, including option pricing and hedging. Advancing recent work in deep learning, we develop novel neural TPDF generators through solving backward Kolmogorov equations in parametric space for cumulative probability functions. The generators are ultra-fast, very accurate and can be trained for any asset model described by stochastic differential equations. These are single solve, so they do not require retraining when parameters of the stochastic model are changed (e.g., recalibration of volatility). Once trained, the neural TDPF generators can be transferred to less powerful computers where they can be used for e.g. option pricing at speeds as fast as if the TPDF were known in a closed form. We illustrate the computational efficiency of the proposed neural approximations of TPDFs by inserting them into numerical option pricing methods. We demonstrate a wide range of applications including the Black-Scholes-Merton model, the standard Heston model, the SABR model, and jump-diffusion models. These numerical experiments confirm the ultra-fast speed and high accuracy of the developed neural TPDF generators.
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