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Numerical Method for American Option Pricing under the Time-Fractional Black–Scholes Model

Author

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  • Yesen Sun
  • Wenxiu Gong
  • Hongliang Dai
  • Long Yuan
  • Francisco Ureña

Abstract

The fractional Black–Scholes model has had limited applications in financial markets. Instead, the time-fractional Black–Scholes equation has attracted much research interest. However, it is difficult to obtain the analytic expression for American option pricing under the time-fractional Black–Scholes model. This paper will present an operator-splitting method to price the American options under the time-fractional Black–Scholes model. The fractional partial differential complementarity problem (FPDCP) that the American option price satisfied is split into two subproblems: a linear boundary value problem and an algebraic system. A high-order compact (HOC) scheme and a grid stretching (GS) method are considered for the linear boundary problem. Furthermore, numerical results show that the HOC scheme with a GS method gives an accurate numerical solution for American options under the time-fractional Black–Scholes model.

Suggested Citation

  • Yesen Sun & Wenxiu Gong & Hongliang Dai & Long Yuan & Francisco Ureña, 2023. "Numerical Method for American Option Pricing under the Time-Fractional Black–Scholes Model," Mathematical Problems in Engineering, Hindawi, vol. 2023, pages 1-17, February.
    • Handle: RePEc:hin:jnlmpe:4669161
    DOI: 10.1155/2023/4669161
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