Add to ORKGWe describe a robust correction to Black-Scholes American derivatives prices that accounts for uncertain and changing market volatility. It exploits the tendency of volatility to cluster, or fast mean-reversion, and is simply calibrated from the observed implied volatility skew. The two-dimensional free-boundary problem for the derivative pricing function under a stochastic volatility model is reduced to a one-dimensional free-boundary problem (the Black-Scholes price) plus the solution of a xed boundary-value problem. The formal asymptotic calculation that achieves this is presented here
Implied volatility is an important element in risk management and option pricing. Black-Scholes mod...
We present derivative pricing and estimation tools for a class of stochastic volatility models that ...
[[abstract]]In this paper, we generalize the recently developed dimension reduction technique of Vec...
We describe a robust correction to Black-Scholes American derivatives prices that accounts for uncer...
Based on a new multiscale hybrid structure of the volatility of the underlying asset price, we study...
Abstract. We address the problems of pricing and hedging derivative securi-ties in an environment of...
We present a derivative pricing and estimation methodology for a class of stochastic volatility mode...
This paper offers a new approach for pricing options on assets with stochastic volatility. We start ...
It is known that actual option prices deviate from the Black-Scholes formula using the same volatili...
In this paper, we generalize the recently developed dimension reduction technique of Vecer for prici...
The 'volatility smile' is one of the well-known biases of Black-Scholes models for pricing options. ...
It is well known that stochastic volatility is an essential feature of commodity spot prices. By usi...
DoctorIn financial engineering, the Black-Scholes model is the most popular and basic model for pric...
Thesis (Ph.D.), Washington State UniversityOptions are a fundamental and important type of financial...
Prices of currency options commonly deffer from the Black-Scholes formula along two dimensions: impl...
Implied volatility is an important element in risk management and option pricing. Black-Scholes mod...
We present derivative pricing and estimation tools for a class of stochastic volatility models that ...
[[abstract]]In this paper, we generalize the recently developed dimension reduction technique of Vec...
We describe a robust correction to Black-Scholes American derivatives prices that accounts for uncer...
Based on a new multiscale hybrid structure of the volatility of the underlying asset price, we study...
Abstract. We address the problems of pricing and hedging derivative securi-ties in an environment of...
We present a derivative pricing and estimation methodology for a class of stochastic volatility mode...
This paper offers a new approach for pricing options on assets with stochastic volatility. We start ...
It is known that actual option prices deviate from the Black-Scholes formula using the same volatili...
In this paper, we generalize the recently developed dimension reduction technique of Vecer for prici...
The 'volatility smile' is one of the well-known biases of Black-Scholes models for pricing options. ...
It is well known that stochastic volatility is an essential feature of commodity spot prices. By usi...
DoctorIn financial engineering, the Black-Scholes model is the most popular and basic model for pric...
Thesis (Ph.D.), Washington State UniversityOptions are a fundamental and important type of financial...
Prices of currency options commonly deffer from the Black-Scholes formula along two dimensions: impl...
Implied volatility is an important element in risk management and option pricing. Black-Scholes mod...
We present derivative pricing and estimation tools for a class of stochastic volatility models that ...
[[abstract]]In this paper, we generalize the recently developed dimension reduction technique of Vec...