Nonparametric Option Pricing with Generalized Entropic Estimators

被引：0

作者：

Almeida, Caio ^{[1
]}

Freire, Gustavo ^{[2
,3
]}

Azevedo, Rafael ^{[4
]}

Ardison, Kym ^{[5
]}

机构：

[1] Princeton Univ, Dept Econ, Princeton, NJ 08544 USA

[2] Erasmus Univ, Erasmus Sch Econ, Rotterdam, Netherlands

[3] EPGE Brazilian Sch Econ & Finance, Rio De Janeiro, Brazil

[4] ASQ Capital, Sao Paulo, Brazil

[5] SPX Capital, Rio De Janeiro, Brazil

来源：

JOURNAL OF BUSINESS & ECONOMIC STATISTICS | 2023年 / 41卷 / 04期

关键词：

Cressie-Read discrepancies; Generalized entropy; Nonparametric estimation; Option pricing; Risk-neutral measure; HEDGING DERIVATIVE SECURITIES; VOLATILITY; MOMENTS; MODEL; IMPLICIT; RETURN; GMM;

D O I：

10.1080/07350015.2022.2115499

中图分类号：

F [经济];

学科分类号：

02 ;

摘要：

We propose a family of nonparametric estimators for an option price that require only the use of underlying return data, but can also easily incorporate information from observed option prices. Each estimator comes from a risk-neutral measure minimizing generalized entropy according to a different Cressie-Read discrepancy. We apply our method to price S&P 500 options and the cross-section of individual equity options, using distinct amounts of option data in the estimation. Estimators incorporating mild nonlinearities produce optimal pricing accuracy within the Cressie-Read family and outperform several benchmarks such as Black-Scholes and different GARCH option pricing models. Overall, we provide a powerful option pricing technique suitable for scenarios of limited option data availability.

引用

页码：1173 / 1187

页数：15

共 50 条

[41] The Complexity of GARCH Option Pricing Models [J].

Chen, Ying-Chie ;

Lyuu, Yuh-Dauh ;

Wen, Kuo-Wei .

JOURNAL OF INFORMATION SCIENCE AND ENGINEERING, 2012, 28 (04) :689-704

[42] A Binary Option Pricing Based on Fuzziness [J].

Miyake, Masatoshi ;

Inoue, Hiroshi ;

Shi, Jianming ;

Shimokawa, Tetsuya .

INTERNATIONAL JOURNAL OF INFORMATION TECHNOLOGY & DECISION MAKING, 2014, 13 (06) :1211-1227

[43] Option pricing using Machine Learning [J].

Ivascu, Codrut-Florin .

EXPERT SYSTEMS WITH APPLICATIONS, 2021, 163

[44] A hybrid modeling approach for option pricing [J].

Hajizadeh, Ehsan ;

Seifi, Abbas .

ADVANCES IN MATHEMATICAL AND COMPUTATIONAL METHODS: ADDRESSING MODERN CHALLENGES OF SCIENCE, TECHNOLOGY, AND SOCIETY, 2011, 1368

[45] Martingalized historical approach for option pricing [J].

Chorro, C. ;

Guegan, D. ;

Ielpo, F. .

FINANCE RESEARCH LETTERS, 2010, 7 (01) :24-28

[46] Option pricing with dynamic conditional skewness [J].

Liang, Fang ;

Du, Lingshan .

JOURNAL OF FUTURES MARKETS, 2024, 44 (07) :1154-1188

[47] The Classical and Stochastic Approach to Option Pricing [J].

Benada, Ludek ;

Cupal, Martin .

EUROPEAN FINANCIAL SYSTEMS 2014, 2014, :49-55

[48] Currency option pricing with Wishart process [J].

Leung, Kwai Sun ;

Wong, Hoi Ying ;

Ng, Hon Yip .

JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2012, 238 :156-170

[49] Quantum option pricing and data analysis [J].

Hao, Wenyan ;

Lefevre, Claude ;

Tamturk, Muhsin ;

Utev, Sergey .

QUANTITATIVE FINANCE AND ECONOMICS, 2019, 3 (03) :490-507

[50] An accurate solution for the generalized Black-Scholes equations governing option pricing [J].

Awasthi, Ashish ;

Riyasudheen, T. K. .

AIMS MATHEMATICS, 2020, 5 (03) :2226-2243

← 1 2 3 4 5 →