Bivariate option pricing with copulas

Cherubini, Umberto; Luciano, Elisa

doi:10.1080/13504860210136721a

Cited by 108 publications

(64 citation statements)

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“…In the field of risk management, some relevant works are Li [9] , Embrechts et al [10] , Cherubini and Luciano [11] or Rosenberg and Schuermann [12] . In the case of pricing multi-asset options, some examples of the use of copulas are Cherubini and Luciano [13] or Rosenberg [14] .…”

Section: Introductionmentioning

confidence: 99%

On a one time-step Monte Carlo simulation approach of the SABR model: Application to European options

Leitao

Grzelak

Oosterlee

2017

Applied Mathematics and Computation

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a b s t r a c tIn this work, we propose a one time-step Monte Carlo method for the SABR model. We base our approach on an accurate approximation of the cumulative distribution function of the time-integrated variance (conditional on the SABR volatility), using Fourier techniques and a copula. Resulting is a fast simulation algorithm which can be employed to price European options under the SABR dynamics. Our approach can thus be seen as an alternative to Hagan's analytic formula for short maturities that may be employed for model calibration purposes.

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Section: Introductionmentioning

confidence: 99%

On a one time-step Monte Carlo simulation approach of the SABR model: Application to European options

Leitao

Grzelak

Oosterlee

2017

Applied Mathematics and Computation

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“…It follows that concordance measures can make the information provided by contour and scatter plots precise. Let us focus on Spearman's rho, the rank correlation coefficient, recalling that it is defined as follows, in copula terms: Table 1 below reproduces the empirical versions of the Spearman's coefficient, using (9), for the cases of Figures 2 and 3, together with the corresponding linear correlation coefficient, computed according to formula (8). To end up with, copulas can be used to define upper and lower tail dependency, which intuitively correspond to dependence of extreme events, as follows.…”

Section: Concordance and Tail Dependence Measuresmentioning

confidence: 99%

A Multivariate Jump-Driven Financial Asset Model

Luciano

Schoutens

2005

SSRN Journal

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We discuss a Lévy multivariate model for financial assets which incorporates jumps, skewness, kurtosis and stochastic volatility. We use it to describe the behavior of a series of stocks or indexes and to study a multi-firm, value-based default model.Starting from an independent Brownian world, we introduce jumps and other deviations from normality, including non-Gaussian dependence. We use a stochastic time-change technique and provide the details for a Gamma change.The main feature of the model is the fact that -opposite to other, non jointly Gaussian settings -its risk neutral dependence can be calibrated from univariate derivative prices, providing a surprisingly good fit. JEL classification numbers: G12, G10.

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“…Some important examples of financial engineering applications are the pricing illiquid exotic derivatives with arbitrary payoffs, copula-based pricing of multi-asset products, and reconstructing a local volatility surface. For example, Monteiro et al (2011) show that implied RND can be used to accurately price Europeanstyle binary options, Cherubini and Luciano (2002) use implied RND to price bivariate equity options and Fengler (2009) uses an interpolant to recover the local volatility surface. Figlewski (2009) points out that interpolation is typically performed in the implied volatility space, which involves fitting a spline or a loworder polynomial to the available data.…”

Section: Proposition 3 Early Exercise Of An Americanmentioning

confidence: 99%

Improved lower bounds of call options written on defaultable assets

Orosi

2014

J Deriv Hedge Funds

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is currently an Assistant Professor in the Department of Mathematics and Statistics at the American University of Sharjah. He holds a PhD in Applied Mathematics with a specialization in mathematical finance from the University of Calgary. His research areas include computational finance and applications, numerical methods applied to derivative pricing, empirical performance of option pricing models and non-parametric modeling.Correspondence: Greg Orosi, Department of Mathematics and Statistics, American University of Sharjah, Nab 254, PO Box 26666, Sharjah, UAE E-mail: gorosi@ucalgary.ca ABSTRACT This article provides an improvedmodel-independent lower bound of European call options written on defaultable assets. On the basis of static arbitrage arguments, improved lower bounds are established, which also depend on the probability of option-implied default. The results are also extended to dividend-paying stocks. Moreover, our findings imply that it is never optimal to exercise certain American call options. Finally, we discuss the implications of our results for constructing an arbitrage-free volatility surface and extracting risk-neutral densities from option prices.

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Bivariate option pricing with copulas

Cited by 108 publications

References 10 publications

On a one time-step Monte Carlo simulation approach of the SABR model: Application to European options

On a one time-step Monte Carlo simulation approach of the SABR model: Application to European options

A Multivariate Jump-Driven Financial Asset Model

Improved lower bounds of call options written on defaultable assets

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