Short-time near-the-money skew in rough fractional volatility models

Bayer, Christian; Friz, Peter K.; Gulisashvili, Archil; Horvath, Blanka; Stemper, Benjamin

doi:10.1080/14697688.2018.1529420

Cited by 70 publications

(125 citation statements)

References 39 publications

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“…so that Θ t is clearly F t -measurable and satisfies (9). We can therefore write the option price as…”

Section: 1mentioning

confidence: 99%

“…We assume that the mean reversion κ, the Hurst parameter H and the initial volatility V 0 are given, while the volatility of volatility ν, the correlation ρ and the long-term variance level V ∞ need to be calibrated. The reason for this choice is practical (the dimension of the optimisation problem is reduced), but can be easily justified: a good proxy for the initial variance V 0 is given by the short-term at-the-money smile, and the Hurst parameter can be calibrated by the maturity-decay of the at-the-money skew of the implied volatility smile; proper and rigorous explanations, via asymptotic limits and expansions, can be found in [3,9,29,30,37,44,52]. We perform a slice by slice calibration, via a minimisation of the difference between market smiles and of model smiles.…”

Section: Model Calibrationmentioning

confidence: 99%

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Deep PPDEs for Rough Local Stochastic Volatility

Jacquier

Oumgari²

2019

SSRN Journal

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“…so that Θ t is clearly F t -measurable and satisfies (9). We can therefore write the option price as…”

Section: 1mentioning

confidence: 99%

Section: Model Calibrationmentioning

confidence: 99%

Deep PPDEs for Rough Local Stochastic Volatility

Jacquier

Oumgari²

2019

SSRN Journal

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“…On the theoretical side, Jacquier, Pakkanen, and Stone [JPS18] prove a pathwise large deviations principle for a rescaled version of the log stock price process. In this same direction, Bayer, Friz, Gulisashvili, Horvath and Stemper [BFGHS17], Horvath, Jacquier and Lacombe [HJL18] and most recently Friz, Gassiat and Pigato [FGP18] (to name a few) extend the large deviations principle to a wider class of rough volatility models. On the practical side, competitive simulation methods are developed in Bennedsen, Lunde and Pakkanen [BLP15], Horvath, Jacquier and Muguruza [HJM17] and McCrickerd and Pakkanen [MP18].…”

Section: Introductionmentioning

confidence: 99%

Asymptotics for Volatility Derivatives in Multi-Factor Rough Volatility Models

2019

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We present small-time implied volatility asymptotics for Realised Variance (RV) and VIX options for a number of (rough) stochastic volatility models via large deviations principle. We provide numerical results along with efficient and robust numerical recipes to compute the rate function; the backbone of our theoretical framework. Based on our results, we further develop approximation schemes for the density of RV, which in turn allows to express the volatility swap in close-form. Lastly, we investigate different constructions of multi-factor models and how each of them affects the convexity of the implied volatility smile. Interestingly, we identify the class of models that generate non-linear smiles around-the-money.Date: March 25, 2019.2010 Mathematics Subject Classification. Primary 60F10, 60G22; Secondary 91G20, 60G15, 91G60. ε > 0, P ε is the joint law and, for each δ > 0, the set ω :and lim sup ε↓0 h ε log P ε (Γ δ ) = −∞, where Γ δ := {(ỹ, y) : d(ỹ, y) > δ} ⊂ Y × Y. Theorem D.2. Let X and Y be topological spaces and f : X → Y a continuous function. Consider a good rate function I : X → [0, ∞]. For each y ∈ Y, define I (y) := inf{I(x) : x ∈ X , y = f (x)}. Then, if I controls the LDP associated with a family of probability measures {µ ε } on X , the I controls the LDP associated with the family of probability measures {µ ε • f −1 } on Y and I is a good rate function on Y.

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“…While the behavior of implied volatility in rough models has mainly been studied by numerical computation, analytic results have been obtained e.g. in [FZ17, GJRS18, FGS19] (short-and/or long-maturity asymptotics) and [Fuk17,BFG`19] (short-time asymptotics of at-the-money skew).…”

Section: Introductionmentioning

confidence: 99%

A comparison principle between rough and non-rough Heston models—with applications to the volatility surface

Keller‐Ressel

Majid

2020

Quantitative Finance

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We present a number of related comparison results, which allow to compare moment explosion times, moment generating functions and critical moments between rough and non-rough Heston models of stochastic volatility. All results are based on a comparison principle for certain non-linear Volterra integral equations. Our upper bound for the moment explosion time is different from the bound introduced by Gerhold, Gerstenecker and Pinter (2018) and tighter for typical parameter values. The results can be directly transferred to a comparison principle for the asymptotic slope of implied volatility between rough and non-rough Heston models. This principle shows that the ratio of implied volatility slopes in the rough vs. the non-rough Heston model increases at least with power-law behavior for small maturities.

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Short-time near-the-money skew in rough fractional volatility models

Cited by 70 publications

References 39 publications

Deep PPDEs for Rough Local Stochastic Volatility

Deep PPDEs for Rough Local Stochastic Volatility

Asymptotics for Volatility Derivatives in Multi-Factor Rough Volatility Models

A comparison principle between rough and non-rough Heston models—with applications to the volatility surface

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