Short-term asymptotics for the implied volatility skew under a stochastic volatility model with Lévy jumps

Figueroa-López, José E.; Ólafsson, Sveinn

doi:10.1007/s00780-016-0313-3

Cited by 21 publications

(19 citation statements)

References 45 publications

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“…Note that these results also follow from the concurrent paper ( Figueroa-López and Ólafsson 2015 ), which treats tempered stable-like models.…”

Section: Examplessupporting

confidence: 79%

“…The recent preprint (Figueroa-López and Ólafsson 2015 ) is also closely related to our work. There, the Brownian component is generalized to stochastic volatility.…”

Section: Introductionsupporting

confidence: 70%

“…See Pinter’s (in preparation ) PhD thesis for details. Note that Equations (6.3) and ( 6.4 ) also follow from concurrent work by Figueroa-López and Ólafsson ( 2015 ). For , they also follow from Proposition 8.5 in Andersen and Lipton ( 2013 ), but not for , because then the constant from that proposition vanishes when specializing it to the CGMY model.…”

Section: Examplesmentioning

confidence: 85%

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Small-Maturity Asymptotics for the At-The-Money Implied Volatility Slope in Lévy Models

Gerhold

Gülüm

Pinter

2016

Applied Mathematical Finance

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We consider the at-the-money (ATM) strike derivative of implied volatility as the maturity tends to zero. Our main results quantify the behaviour of the slope for infinite activity exponential Lévy models including a Brownian component. As auxiliary results, we obtain asymptotic expansions of short maturity ATM digital call options, using Mellin transform asymptotics. Finally, we discuss when the ATM slope is consistent with the steepness of the smile wings, as given by Lee’s moment formula.

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“…Note that these results also follow from the concurrent paper ( Figueroa-López and Ólafsson 2015 ), which treats tempered stable-like models.…”

Section: Examplessupporting

confidence: 79%

“…The recent preprint (Figueroa-López and Ólafsson 2015 ) is also closely related to our work. There, the Brownian component is generalized to stochastic volatility.…”

Section: Introductionsupporting

confidence: 70%

Section: Examplesmentioning

confidence: 85%

See 1 more Smart Citation

Small-Maturity Asymptotics for the At-The-Money Implied Volatility Slope in Lévy Models

Gerhold

Gülüm

Pinter

2016

Applied Mathematical Finance

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“…Roughly, the conditions above amount to say that the small jumps of X behave like those of a Y -stable Lévy process. We refer the reader to [12] for further background about this class. The parameter Y is called the index of jump activity and coincides with the Blumenthal-Getoor index, which controls the jump activity of X in that s∈(0,t] |∆X s | γ < ∞ for all γ > Y and t > 0, where ∆X s := X s − X s− is the jump of X at time s. The range of Y considered here (namely, Y ∈ (1, 2)) is the most relevant for financial applications based on several econometric studies of high-frequency financial data (cf.…”

Section: The Model and Some Preliminary Resultsmentioning

confidence: 99%

Estimation of Tempered Stable Lévy Models of Infinite Variation

Figueroa-López¹,

Gong²,

Han³

2021

Preprint

Self Cite

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In this paper we propose a new method for the estimation of a semiparametric tempered stable Lévy model. The estimation procedure combines iteratively an approximate semiparametric method of moment estimator, Truncated Realized Quadratic Variations (TRQV), and a newly found small-time high-order approximation for the optimal threshold of the TRQV of tempered stable processes. The method is tested via simulations to estimate the volatility and the Blumenthal-Getoor index of the generalized CGMY model as well as the integrated volatility of a Heston type model with CGMY jumps. The method outperforms other efficient alternatives proposed in the literature.MSC 2000 subject classifications: 60G51, 62M09.

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“…The current paper is related to several strands of literature. First, Lévybased approximations of short-dated options have been studied with various degrees of generality in earlier work, see e.g., [1], [6], [15], [16,17] and [24], and the many references therein. The results of these papers are typically derived for a single option with a fixed strike while here we are interested in the approximation across the whole range of strikes that cover the positive real line.…”

mentioning

confidence: 99%

Nonparametric implied Lévy densities

Qin¹,

Todorov²

2019

Ann. Statist.

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This paper develops a nonparametric estimator for the Lévy density of an asset price, following an Itô semimartingale, implied by short-maturity options. The asymptotic setup is one in which the time to maturity of the available options decreases, the mesh of the available strike grid shrinks and the strike range expands. The estimation is based on aggregating the observed option data into nonparametric estimates of the conditional characteristic function of the return distribution, the derivatives of which allow to infer the Fourier transform of a known transform of the Lévy density in a way which is robust to the level of the unknown diffusive volatility of the asset price. The Lévy density estimate is then constructed via Fourier inversion. We derive an asymptotic bound for the integrated squared error of the estimator in the general case as well as its probability limit in the special Lévy case. We further show rate optimality of our Lévy density estimator in a minimax sense. An empirical application to market index options reveals relative stability of the left tail decay during high and low volatility periods.

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Short-term asymptotics for the implied volatility skew under a stochastic volatility model with Lévy jumps

Cited by 21 publications

References 45 publications

Small-Maturity Asymptotics for the At-The-Money Implied Volatility Slope in Lévy Models

Small-Maturity Asymptotics for the At-The-Money Implied Volatility Slope in Lévy Models

Estimation of Tempered Stable Lévy Models of Infinite Variation

Nonparametric implied Lévy densities

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