Andrea Barletta scite author profile

We consider a modeling setup where the volatility index (VIX) dynamics are explicitly computable as a smooth transformation of a purely diffusive, multidimensional Markov process. The framework is general enough to embed many popular stochastic volatility models. We develop closed‐form expansions and sharp error bounds for VIX futures, options, and implied volatilities. In particular, we derive exact asymptotic results for VIX‐implied volatilities, and their sensitivities, in the joint limit of short time‐to‐maturity and small log‐moneyness. The expansions obtained are explicit based on elementary functions and they neatly uncover how the VIX skew depends on the specific choice of the volatility and the vol‐of‐vol processes. Our results are based on perturbation techniques applied to the infinitesimal generator of the underlying process. This methodology has previously been adopted to derive approximations of equity (SPX) options. However, the generalizations needed to cover the case of VIX options are by no means straightforward as the dynamics of the underlying VIX futures are not explicitly known. To illustrate the accuracy of our technique, we provide numerical implementations for a selection of model specifications.

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Orthogonal expansions for VIX options under affine jump diffusions

Barletta

Nicolato

2017

Quantitative Finance

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It Only Takes a Few Moments to Hedge

Barletta¹,

Magistris

Sloth³

2017

SSRN Journal

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A non-structural investigation of VIX risk neutral density

Barletta

Magistris

Violante

2019

Journal of Banking & Finance

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A Non-Structural Investigation of VIX Risk Neutral Density

2017

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Andrea Barletta

The short‐time behavior of VIX‐implied volatilities in a multifactor stochastic volatility framework

Orthogonal expansions for VIX options under affine jump diffusions

It Only Takes a Few Moments to Hedge

A non-structural investigation of VIX risk neutral density

A Non-Structural Investigation of VIX Risk Neutral Density

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