Closed-form Solutions of the Time-fractional Standard Black-Scholes Model for Option Pricing using He-separation of Variable Approach-Reference-Cited by-同舟云学术

Closed-form Solutions of the Time-fractional Standard Black-Scholes Model for Option Pricing using He-separation of Variable Approach

Published:2020-04-15 Issue: Volume:16 Page:172-179
ISSN:1790-5079
Container-title:WSEAS TRANSACTIONS ON ENVIRONMENT AND DEVELOPMENT
language:en
Short-container-title:

Author:

Edeki S. O.¹,Akinlabi G. O.¹,Egara F. O.²,Nzeadibe A. C.²

Affiliation:

1. Department of Mathematics, Covenant University, Ota, NIGERIA

2. Department of Science Education, University of Nigeria, Nsukka, NIGERIA

Abstract

The Black-Scholes option pricing model in classical form remains a benchmark model in Financial Engineering and Mathematics concerning option valuation. Though, it has received a series of modifications as regards its initial constancy assumptions. Most of the resulting modifications are nonlinear or time-fractional, whose exact or analytical solutions are difficult to obtain. This paper, therefore, presents exact (closed-form) solutions to the time-fractional classical Black-Scholes option pricing model by means of the He-Separation of Variable Transformation Method (HSVTM). The HSVTM combines the features of the He’s polynomials, the Homo-separation variable, the modified DTM, which increases the efficiency and effectiveness of the proposed method. The proposed method is direct and straight forward. Hence, it is recommended for obtaining solutions to financial models resulting from either Ito or Stratonovich Stochastic Differential Equations (SDEs).

Publisher

World Scientific and Engineering Academy and Society (WSEAS)

Subject

General Energy,General Environmental Science,Geography, Planning and Development

Reference42 articles.

1. S. Kumar, A. Yildirim, Y. Khan, H. Jafari, K. Sayevand, and L. Wey, Analytical solution of fractional Black-Scholes, European option pricing equation by using Laplace transform, J. of Fractional Calculus and Applications, 2, (2012), 1-9.

2. S.O. Edeki, O.O. Ugbebor, and E.A. Owoloko, Analytical Solution of the Time-fractional Order Black-Scholes Model for Stock Option Valuation on No Dividend Yield Basis, IAENG International Journal of Applied Mathematics, 47 (4), (2017), 407-416.

3. I. Podlubny. Fractional Differential Equation, Academic Press, San Diego (1999).

4. R.M. Jena and S. Chakraverty. Residual Power Series Method for Solving Time-fractional Model of Vibration Equation of Large Membranes, J. Appl. Comput. Mech. 5 (4), (2019), 603-615.

5. D. Baleanu, K. Diethelm, E. Scalas, J.J. Trujillo, Fractional Calculus: Models and Numerical Methods, World Scientific Publishing Company: Boston, MA, USA, (2012).

Cited by 5 articles. 订阅此论文施引文献订阅此论文施引文献，注册后可以免费订阅5篇论文的施引文献，订阅后可以查看论文全部施引文献

1. Foundations and trends in option pricing models: a 45 years global examination based on bibliometric analysis;Qualitative Research in Financial Markets;2024-03-20

2. A bibliographic overview of financial engineering in the emerging financial market;International Journal of System Assurance Engineering and Management;2023-09-14

3. A bibliometric analysis on financial engineering studies;International Journal of Financial Engineering;2023-02-23

4. A Python Application Software to Option Pricing and the Estimation of Price Sensitivities as a Component of a Financial Information System;2022 7th International Conference on Mathematics and Computers in Sciences and Industry (MCSI);2022-08

5. The Pricing Problem of Rainbow Option in Uncertain Financial Market;WSEAS TRANSACTIONS ON BUSINESS AND ECONOMICS;2022-07-06