American option evaluations using higher moments

IF 2.3 Q2 BUSINESS, FINANCE

Studies in Economics and Finance Pub Date : 2023-11-21 DOI:10.1108/sef-08-2023-0458

Patrice Gaillardetz, Saeb Hachem

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引用次数: 0

Abstract

Purpose

By using higher moments, this paper extends the quadratic local risk-minimizing approach in a general discrete incomplete financial market. The local optimization subproblems are convex or nonconvex, depending on the moment variants used in the modeling. Inspired by Lai et al. (2006), the authors propose a new multiobjective approach for the combination of moments that is transformed into a multigoal programming problem.

Design/methodology/approach

The authors evaluate financial derivatives with American features using local risk-minimizing strategies. The financial structure is in line with Schweizer (1988): the market is discrete, self-financing is not guaranteed, but deviations are controlled and reduced by minimizing the second moment. As for the quadratic approach, the algorithm proceeds backwardly.

Findings

In the context of evaluating American option, a transposition of this multigoal programming leads not only to nonconvex optimization subproblems but also to the undesirable fact that local zero deviations from self-financing are penalized. The analysis shows that issuers should consider some higher moments when evaluating contingent claims because they help reshape the distribution of global cumulative deviations from self-financing.

Practical implications

A detailed numerical analysis that compares all the moments or some combinations of them is performed.

Originality/value

The quadratic approach is extended by exploring other higher moments, positive combinations of moments and variants to enforce asymmetry. This study also investigates the impact of two types of exercise decisions and multiple assets.

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使用高矩的美式期权评估

目的利用高矩，推广了一般离散不完全金融市场的二次局部风险最小化方法。局部优化子问题是凸的或非凸的，这取决于建模中使用的矩变量。受Lai等人(2006)的启发，作者提出了一种新的多目标方法，将矩的组合转化为多目标规划问题。设计/方法/方法作者使用本地风险最小化策略评估具有美国特色的金融衍生品。财务结构符合Schweizer(1988):市场是离散的，自筹资金不保证，但通过最小化第二时刻来控制和减少偏差。对于二次型方法，算法是反向进行的。在评估American option的情况下，这种多目标规划的转换不仅会导致非凸优化子问题，而且会导致局部零偏离自融资的不利事实。分析表明，发行人在评估或有债权时应考虑一些较高的时刻，因为它们有助于重塑全球累积偏离自我融资的分布。实际意义进行了详细的数值分析，对所有矩或它们的某些组合进行了比较。原创性/价值二次方法通过探索其他更高的矩、矩和变体的正组合来扩展，以加强不对称性。本研究还探讨了两种类型的运动决策和多资产的影响。

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

Studies in Economics and Finance BUSINESS, FINANCE-

CiteScore

4.30

自引率

10.50%

发文量

期刊介绍： Topics addressed in the journal include: ■corporate finance, ■financial markets, ■money and banking, ■international finance and economics, ■investments, ■risk management, ■theory of the firm, ■competition policy, ■corporate governance.