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Markovian approximations of stochastic Volterra equations with the fractional kernel

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  • Christian Bayer
  • Simon Breneis

Abstract

We consider rough stochastic volatility models where the variance process satisfies a stochastic Volterra equation with the fractional kernel, as in the rough Bergomi and the rough Heston model. In particular, the variance process is therefore not a Markov process or semimartingale, and has quite low Hölder-regularity. In practice, simulating such rough processes thus often results in high computational cost. To remedy this, we study approximations of stochastic Volterra equations using an N-dimensional diffusion process defined as solution to a system of ordinary stochastic differential equation. If the coefficients of the stochastic Volterra equation are Lipschitz continuous, we show that these approximations converge strongly with superpolynomial rate in N. Finally, we apply this approximation to compute the implied volatility smile of a European call option under the rough Bergomi and the rough Heston model.

Suggested Citation

  • Christian Bayer & Simon Breneis, 2023. "Markovian approximations of stochastic Volterra equations with the fractional kernel," Quantitative Finance, Taylor & Francis Journals, vol. 23(1), pages 53-70, January.
  • Handle: RePEc:taf:quantf:v:23:y:2023:i:1:p:53-70
    DOI: 10.1080/14697688.2022.2139193
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    Citations

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    Cited by:

    1. Mohamed Ben Alaya & Martin Friesen & Jonas Kremer, 2024. "Ergodicity and Law-of-large numbers for the Volterra Cox-Ingersoll-Ross process," Papers 2409.04496, arXiv.org.
    2. Antonis Papapantoleon & Jasper Rou, 2024. "A time-stepping deep gradient flow method for option pricing in (rough) diffusion models," Papers 2403.00746, arXiv.org.
    3. Alexandre Pannier, 2023. "Path-dependent PDEs for volatility derivatives," Papers 2311.08289, arXiv.org, revised Jan 2024.
    4. Changqing Teng & Guanglian Li, 2024. "Neural option pricing for rough Bergomi model," Papers 2402.02714, arXiv.org.

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