English

The small-maturity smile for exponential Levy models

Pricing of Securities 2011-12-15 v2 Probability Computational Finance

Abstract

We derive a small-time expansion for out-of-the-money call options under an exponential Levy model, using the small-time expansion for the distribution function given in Figueroa-Lopez & Houdre (2009), combined with a change of num\'eraire via the Esscher transform. In particular, we quantify find that the effect of a non-zero volatility σ\sigma of the Gaussian component of the driving L\'{e}vy process is to increase the call price by 1/2σ2t2ekν(k)(1+o(1))1/2\sigma^2 t^2 e^{k}\nu(k)(1+o(1)) as t0t \to 0, where ν\nu is the L\'evy density. Using the small-time expansion for call options, we then derive a small-time expansion for the implied volatility, which sharpens the first order estimate given in Tankov (2010). Our numerical results show that the second order approximation can significantly outperform the first order approximation. Our results are also extended to a class of time-changed L\'evy models. We also consider a small-time, small log-moneyness regime for the CGMY model, and apply this approach to the small-time pricing of at-the-money call options.

Keywords

Cite

@article{arxiv.1105.3180,
  title  = {The small-maturity smile for exponential Levy models},
  author = {Jose E. Figueroa-Lopez and Martin Forde},
  journal= {arXiv preprint arXiv:1105.3180},
  year   = {2011}
}

Comments

25 pages, 4 figures

R2 v1 2026-06-21T18:08:06.021Z