Add to ORKGBased on the theory of Tangent Levy model [1] developed by R. Carmona and S. Nadtochiy, this thesis gives a paramatrized realization of dynamic implied smile.\ud \ud After specifying a Dirac style Levy measure, we give argument about the consistency issue of our model with the Tangent Levy Model. A corresponding no arbitrage drift condition is derived for the parameters. Numerical setup under our model for option pricing and parameter estimation for calibration is given. Implementation results are illustrated in detail and in the end we provide with simulation results of one day ahead implied smile
This paper studies the behavior of the implied volatility function (smile) when the true distributio...
This paper provides an industry standard on how to quantify the shape of the implied volatility smir...
We develop a discrete-time stochastic volatility option pricing model exploiting the information con...
Based on the theory of Tangent Levy model [1] developed by R. Carmona and S. Nadtochiy, this thesis ...
This review paper focuses on the smile-consistent stochastic volatility models. Smile-consistent sto...
In the past 30 years, the progress of option pricing theory and models are dramatic, from the classi...
Nonparametric methods for estimating the implied volatility surface or the implied volatility smile ...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/136026/1/mafi12086.pdfhttp://deepblue.l...
This paper tests whether the true smile in implied volatilities is flat. The smile in observed Black...
We develop a dynamic version of the SSVI parameterization for the total implied variance, ensuring t...
The purpose of this paper is to introduce a new approach that allows to construct no-arbitrage marke...
We introduce a new approach that allows to construct no-arbitrage market models of implied volatilit...
We present a theory of option pricing and hedging, designed to address non-perfect arbitrage, market...
This paper gives an arbitrage-free prediction for future prices of an arbitrary co-terminal set of o...
This paper studies modeling and existence issues for market models of option prices in a continuous-...
This paper studies the behavior of the implied volatility function (smile) when the true distributio...
This paper provides an industry standard on how to quantify the shape of the implied volatility smir...
We develop a discrete-time stochastic volatility option pricing model exploiting the information con...
Based on the theory of Tangent Levy model [1] developed by R. Carmona and S. Nadtochiy, this thesis ...
This review paper focuses on the smile-consistent stochastic volatility models. Smile-consistent sto...
In the past 30 years, the progress of option pricing theory and models are dramatic, from the classi...
Nonparametric methods for estimating the implied volatility surface or the implied volatility smile ...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/136026/1/mafi12086.pdfhttp://deepblue.l...
This paper tests whether the true smile in implied volatilities is flat. The smile in observed Black...
We develop a dynamic version of the SSVI parameterization for the total implied variance, ensuring t...
The purpose of this paper is to introduce a new approach that allows to construct no-arbitrage marke...
We introduce a new approach that allows to construct no-arbitrage market models of implied volatilit...
We present a theory of option pricing and hedging, designed to address non-perfect arbitrage, market...
This paper gives an arbitrage-free prediction for future prices of an arbitrary co-terminal set of o...
This paper studies modeling and existence issues for market models of option prices in a continuous-...
This paper studies the behavior of the implied volatility function (smile) when the true distributio...
This paper provides an industry standard on how to quantify the shape of the implied volatility smir...
We develop a discrete-time stochastic volatility option pricing model exploiting the information con...