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L\'evy models amenable to efficient calculations

Probability 2022-07-07 v1 Computational Finance Mathematical Finance

Abstract

In our previous publications (IJTAF 2019, Math. Finance 2020), we introduced a general class of SINH-regular processes and demonstrated that efficient numerical methods for the evaluation of the Wiener-Hopf factors and various probability distributions (prices of options of several types) in L\'evy models can be developed using only a few general properties of the characteristic exponent ψ\psi. Essentially all popular L\'evy processes enjoy these properties. In the present paper, we define classes of Stieltjes-L\'evy processes (SL-processes) as processes with completely monotone L\'evy densities of positive and negative jumps, and signed Stieltjes-L\'evy processes (sSL-processes) as processes with densities representable as differences of completely monotone densities. We demonstrate that 1) all crucial properties of ψ\psi are consequences of the representation ψ(ξ)=(a2+ξ2ia1+ξ)ST(\cG+)(iξ)+(a2ξ2+ia1ξ)ST(\cG)(iξ)+(\sg2/2)ξ2iμξ\psi(\xi)=(a^+_2\xi^2-ia^+_1\xi)ST(\cG_+)(-i\xi)+(a^-_2\xi^2+ia^-_1\xi)ST(\cG_-)(i\xi)+(\sg^2/2)\xi^2-i\mu\xi, where ST(\cG)ST(\cG) is the Stieltjes transform of the (signed) Stieltjes measure \cG\cG and aj±0a^\pm_j\ge 0; 2) essentially all popular processes other than Merton's model and Meixner processes areSL-processes; 3) Meixner processes are sSL-processes; 4) under a natural symmetry condition, essentially all popular classes of L\'evy processes are SL- or sSL-subordinated Brownian motion.

Keywords

Cite

@article{arxiv.2207.02359,
  title  = {L\'evy models amenable to efficient calculations},
  author = {Svetlana Boyarchenko and Sergei Levendorskiĭ},
  journal= {arXiv preprint arXiv:2207.02359},
  year   = {2022}
}

Comments

46 pages

R2 v1 2026-06-24T12:15:12.438Z