倒向随机微分方程的数值方法综述

IF 1.3 Q2 STATISTICS & PROBABILITY
Chessari, Jared, Kawai, Reiichiro, Shinozaki, Yuji, Yamada, Toshihiro
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引用次数: 3

摘要

倒向随机微分方程(BSDEs)已广泛应用于社会科学和自然科学的各个领域,如金融衍生品的定价和对冲、随机最优控制问题、最优停止问题和基因表达。大多数bsde不能解析求解,因此必须采用数值方法来近似求解。在过去的几十年里,已经提出了各种各样的数值方法,目前正在开发更多的数值方法。在大多数情况下,它们以复杂和分散的方式存在,每个都需要各种假设和条件。因此,本工作的目的是系统地调查BSDEs的各种数值方法,特别是对它们进行比较和分类,以便进一步发展和改进。为了实现这一目标,我们基于333篇文献的广泛收集,主要关注每种方法的核心特征:主要假设,数值算法本身,关键收敛特性和优缺点,为BSDEs提供最新的数值方法覆盖,对每种方法进行深刻的总结,并进行有用的比较和分类。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Numerical methods for backward stochastic differential equations: A survey
Backward Stochastic Differential Equations (BSDEs) have been widely employed in various areas of social and natural sciences, such as the pricing and hedging of financial derivatives, stochastic optimal control problems, optimal stopping problems and gene expression. Most BSDEs cannot be solved analytically and thus numerical methods must be applied to approximate their solutions. There have been a variety of numerical methods proposed over the past few decades as well as many more currently being developed. For the most part, they exist in a complex and scattered manner with each requiring a variety of assumptions and conditions. The aim of the present work is thus to systematically survey various numerical methods for BSDEs, and in particular, compare and categorize them, for further developments and improvements. To achieve this goal, we focus primarily on the core features of each method based on an extensive collection of 333 references: the main assumptions, the numerical algorithm itself, key convergence properties and advantages and disadvantages, to provide an up-to-date coverage of numerical methods for BSDEs, with insightful summaries of each and a useful comparison and categorization.
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来源期刊
Probability Surveys
Probability Surveys STATISTICS & PROBABILITY-
CiteScore
4.70
自引率
0.00%
发文量
9
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