Add to ORKGThis paper develops a non-finite-difference-based method of American option pricing under stochastic volatility by extending the Geske-Johnson compound option scheme. The characteristic function of the underlying state vector is inverted to obtain the vector’s density using a kernel-smoothed fast Fourier transform technique. The method produces option values that are closely in line with the values obtained by finite-difference schemes. It also performs well in an empirical application with traded S&P 100 index options. The method is especially well suited to price a set of options with different strikes on the same underlying asset, which is a task often encountered by practitioners
This paper applies the fast Fourier transform (FFT) approach, within the Black-Scholes framework, to...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
This thesis develops a generic framework based on the Fourier transform for pricing and hedging of v...
Theoretical research on option valuation tends to focus on pricing the plain-vanilla European-style ...
This paper describes a fast, flexible numerical technique to price American options and generate the...
Spread options are notoriously difficult to price without the use of Monte Carlo simulation. Some s...
Compound options are not only sensitive to future movements of the underlying asset price, but also ...
We present a new efficient and robust framework for European option pricing under continuous-time as...
The fast Fourier transform (FFT), even though it has been widely applicable in Physics and Engineeri...
This paper is concerned with fast Fourier transform (FFT) approach to option valuation, where the un...
A fast and accurate method for pricing early exercise and certain exotic options in computational fi...
The Fourier transform is an important tool in Financial Economics. It delivers real time pricing whi...
We present an acceleration technique, effective for explicit finite difference schemes describing d...
We compute an analytical expression for the moment generating function of the joint random vector co...
This paper compares the performance of three methods for pricing vanilla options in models with know...
This paper applies the fast Fourier transform (FFT) approach, within the Black-Scholes framework, to...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
This thesis develops a generic framework based on the Fourier transform for pricing and hedging of v...
Theoretical research on option valuation tends to focus on pricing the plain-vanilla European-style ...
This paper describes a fast, flexible numerical technique to price American options and generate the...
Spread options are notoriously difficult to price without the use of Monte Carlo simulation. Some s...
Compound options are not only sensitive to future movements of the underlying asset price, but also ...
We present a new efficient and robust framework for European option pricing under continuous-time as...
The fast Fourier transform (FFT), even though it has been widely applicable in Physics and Engineeri...
This paper is concerned with fast Fourier transform (FFT) approach to option valuation, where the un...
A fast and accurate method for pricing early exercise and certain exotic options in computational fi...
The Fourier transform is an important tool in Financial Economics. It delivers real time pricing whi...
We present an acceleration technique, effective for explicit finite difference schemes describing d...
We compute an analytical expression for the moment generating function of the joint random vector co...
This paper compares the performance of three methods for pricing vanilla options in models with know...
This paper applies the fast Fourier transform (FFT) approach, within the Black-Scholes framework, to...
Several existing pricing models of financial derivatives as well as the effects of volatility risk a...
This thesis develops a generic framework based on the Fourier transform for pricing and hedging of v...