Accelerated numerical solutions for discretized black-scholes equations

IF 1.9 3区工程技术 Q3 MANAGEMENT

IMA Journal of Management Mathematics Pub Date : 2024-04-02 DOI:10.1093/imaman/dpae006

Foued Saâdaoui

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引用次数: 0

Abstract

This study thoroughly investigates the efficiency of advanced numerical extrapolation methods aimed at enhancing the convergence of vector sequences in the realm of mathematical finance. Our focus lies in the application of polynomial extrapolation techniques to calculate finite difference solutions for the Black-Scholes (BS) equation–an indispensable model in options pricing. The performance of our algorithms undergoes rigorous evaluation through a comprehensive analysis involving both simulated and real-world data. Notably, our experiments uncover that a stochastic scheme, incorporating two extrapolation strategies and a random relaxation parameter, outperforms other proposed methods, excelling in both convergence and stability metrics. Our findings underscore the potential of this numerical extrapolation method to enhance the efficiency of financial calculations, particularly in the realm of option pricing. This innovation holds promise for refining financial models and addressing specific challenges within the field of mathematical programming, providing effective solutions to the primary computational bottlenecks commonly encountered in financial decision-making.

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离散化黑舒尔斯方程的加速数值解法

本研究深入探讨了旨在提高数学金融领域向量序列收敛性的先进数值外推法的效率。我们的重点是应用多项式外推法计算布莱克-斯科尔斯（BS）方程的有限差分解--这是期权定价中不可或缺的模型。通过对模拟数据和实际数据的综合分析，我们对算法的性能进行了严格评估。值得注意的是，我们的实验发现，包含两种外推策略和一个随机松弛参数的随机方案优于其他建议的方法，在收敛性和稳定性指标上都表现出色。我们的发现强调了这种数值外推法在提高金融计算效率方面的潜力，尤其是在期权定价领域。这一创新有望完善金融模型，解决数学编程领域的具体挑战，为金融决策中常见的主要计算瓶颈提供有效的解决方案。

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

IMA Journal of Management Mathematics OPERATIONS RESEARCH & MANAGEMENT SCIENCE-MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

CiteScore

4.70

自引率

17.60%

发文量

审稿时长

>12 weeks

期刊介绍： The mission of this quarterly journal is to publish mathematical research of the highest quality, impact and relevance that can be directly utilised or have demonstrable potential to be employed by managers in profit, not-for-profit, third party and governmental/public organisations to improve their practices. Thus the research must be quantitative and of the highest quality if it is to be published in the journal. Furthermore, the outcome of the research must be ultimately useful for managers. The journal also publishes novel meta-analyses of the literature, reviews of the "state-of-the art" in a manner that provides new insight, and genuine applications of mathematics to real-world problems in the form of case studies. The journal welcomes papers dealing with topics in Operational Research and Management Science, Operations Management, Decision Sciences, Transportation Science, Marketing Science, Analytics, and Financial and Risk Modelling.