人工神经网络
背景(考古学)
趋同(经济学)
数学
数学优化
应用数学
计算机科学
偏微分方程
构造(python库)
简单(哲学)
波动性(金融)
回归
算法
类型(生物学)
数值分析
人工智能
微分方程
作者
Antoine Jacquier,Žan Žurič
标识
DOI:10.1007/s00245-026-10392-5
摘要
Abstract We construct a deep learning-based numerical algorithm to solve path-dependent partial differential equations arising in the context of rough volatility. Our approach is based on interpreting the PDE as a solution to an BSDE, building upon recent insights by Bayer, Qiu and Yao, and on constructing a neural network of reservoir type as originally developed by Gonon, Grigoryeva, Ortega. The reservoir approach allows us to formulate the optimisation problem as a simple least-square regression for which we prove theoretical convergence properties.
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