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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 H\"older-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.

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  • Christian Bayer & Simon Breneis, 2021. "Markovian approximations of stochastic Volterra equations with the fractional kernel," Papers 2108.05048, arXiv.org, revised Jul 2022.
  • Handle: RePEc:arx:papers:2108.05048
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    Cited by:

    1. Enrico Dall’Acqua & Riccardo Longoni & Andrea Pallavicini, 2023. "Rough-Heston Local-Volatility Model," International Journal of Theoretical and Applied Finance (IJTAF), World Scientific Publishing Co. Pte. Ltd., vol. 26(06n07), pages 1-18, November.

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