障碍期权定价与生存概率计算的多维希尔伯特变换方法

IF 0.7 4区 经济学 Q4 BUSINESS, FINANCE
Jie Chen, Liaoyuan Fan, Lingfei Li, Gongqiu Zhang
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引用次数: 2

摘要

本文提出了一种多维希尔伯特变换方法,用于离散监控的多资产障碍期权定价和多元指数型lsamvy资产价格模型的联合生存概率计算。我们将Feng和Linetsky的单变量Hilbert变换方法(数学金融18(3),337-384,2008)推广到单资产障碍期权和Stenger著名的Sinc逼近理论(基于Sinc和解析函数的数值方法)。Springer,纽约,1993)计算一维希尔伯特变换到任何维度。我们证明,对于具有指数衰减尾的联合特征函数的lsamvy过程,我们的方法的误差在每个维度展开中使用的项数的若干次幂上呈指数衰减。数值实验证明了该方法在二维和三维问题上的有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

A multidimensional Hilbert transform approach for barrier option pricing and survival probability calculation

A multidimensional Hilbert transform approach for barrier option pricing and survival probability calculation

This paper proposes a multidimensional Hilbert transform approach for pricing discretely monitored multi-asset barrier options and computing joint survival probability in multivariate exponential Lévy asset price models. We generalize the univariate Hilbert transform method of Feng and Linetsky (Math Financ 18(3), 337–384, 2008) for single-asset barrier options and the well-known Sinc approximation theory of Stenger (Numerical methods based on sinc and analytic functions. Springer, New York, 1993) for computing the one-dimensional Hilbert transform to any dimension. We prove that, for Lévy processes with joint characteristic functions having an exponentially decaying tail, the error of our method decays exponentially in some power of the number of terms used in the expansion for each dimension. Numerical experiments demonstrate the efficiency of our method in the two-dimensional and three-dimensional problems for some popular multivariate Lévy models.

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来源期刊
CiteScore
1.40
自引率
0.00%
发文量
8
期刊介绍: The proliferation of derivative assets during the past two decades is unprecedented. With this growth in derivatives comes the need for financial institutions, institutional investors, and corporations to use sophisticated quantitative techniques to take full advantage of the spectrum of these new financial instruments. Academic research has significantly contributed to our understanding of derivative assets and markets. The growth of derivative asset markets has been accompanied by a commensurate growth in the volume of scientific research. The Review of Derivatives Research provides an international forum for researchers involved in the general areas of derivative assets. The Review publishes high-quality articles dealing with the pricing and hedging of derivative assets on any underlying asset (commodity, interest rate, currency, equity, real estate, traded or non-traded, etc.). Specific topics include but are not limited to: econometric analyses of derivative markets (efficiency, anomalies, performance, etc.) analysis of swap markets market microstructure and volatility issues regulatory and taxation issues credit risk new areas of applications such as corporate finance (capital budgeting, debt innovations), international trade (tariffs and quotas), banking and insurance (embedded options, asset-liability management) risk-sharing issues and the design of optimal derivative securities risk management, management and control valuation and analysis of the options embedded in capital projects valuation and hedging of exotic options new areas for further development (i.e. natural resources, environmental economics. The Review has a double-blind refereeing process. In contrast to the delays in the decision making and publication processes of many current journals, the Review will provide authors with an initial decision within nine weeks of receipt of the manuscript and a goal of publication within six months after acceptance. Finally, a section of the journal is available for rapid publication on `hot'' issues in the market, small technical pieces, and timely essays related to pending legislation and policy. Officially cited as: Rev Deriv Res
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