论文信息 - A Weighted Strike-Related Implied Volatility Model

A Weighted Strike-Related Implied Volatility Model

The implied volatility in the Black-Scholes model is assumed as a constant. However, empirical analysis proves that the values of the implied volatility based on the same underlying asset vary with the underlying asset price, maturity date, time to maturity, and the strike price. Ronald Lagnado and Stanley Osher and Chiarella proposed the techniques for calibrating derivative pricing by solving an inverse problem. In this paper, an improved model is proposed. In which, the influence of the options with different strike prices is distinguished by weights and the choices of the weight functions are discussed. The approach we take is numerically solving an inverse problem which is more solid in theory than simple regression methods. Numerical results show that our model has better adaptivity and accuracy than traditional models.

[1] Forward/forward volatilities and the term structure of implied volatility , 1997 .

[2] C. Chiarella,et al. The Calibration of Stock Option Pricing Models Using Inverse Problem Methodology , 2000 .

[3] Fei Chen,et al. A Gaussian semi-parametric implied volatility model , 2017 .

[4] Jeff Fleming,et al. Implied volatility functions: empirical tests , 1996, IEEE/IAFE 1996 Conference on Computational Intelligence for Financial Engineering (CIFEr).

[5] Svetlana Borovkova,et al. Implied volatility in oil markets , 2009, Comput. Stat. Data Anal..

[6] Cristian Homescu. Implied Volatility Surface: Construction Methodologies and Characteristics , 2011, 1107.1834.

[7] A. Kemna,et al. Analysis of the Term Structure of Implied Volatilities , 1994, Journal of Financial and Quantitative Analysis.

[8] Stanley Osher,et al. A technique for calibrating derivative security pricing models: numerical solution of an inverse problem , 1997 .

[9] F. Black,et al. The Pricing of Options and Corporate Liabilities , 1973, Journal of Political Economy.