This paper applies the fast Fourier transform (FFT) approach, within the Black-Scholes framework, to the valuation of options whose time to maturity can be extended to a future date (extendible options). We determine the valuation of the extendible options as sums of expectations of indicator functions, leading to a semianalytic expression for the value of the options over a range of strikes. Compared to Monte Carlo simulation, numerical examples demonstrate that the FFT is both computationally more efficient and higher in accuracy
The aim of this article is to provide a systematic analysis of the conditions such that Fourier tran...
This thesis develops a generic framework based on the Fourier transform for pricing and hedging of v...
This paper develops a non-finite-difference-based method of American option pricing under stochastic...
The fast Fourier transform (FFT), even though it has been widely applicable in Physics and Engineeri...
A fast and accurate method for pricing early exercise and certain exotic options in computational fi...
Abstract. A fast and accurate method for pricing early exercise and certain exotic options in comput...
This paper is concerned with fast Fourier transform (FFT) approach to option valuation, where the un...
This paper describes a fast, flexible numerical technique to price American options and generate the...
Options with extendable features have many applications in finance and these provide the motivation ...
This note presents a simple, robust and computationally efficient way to calculate expectations of a...
textabstractIn this overview chapter, we will discuss the use of exponentially converging option pri...
A model for valuing a European-style commodity option and a futures option is discussed with a view ...
The earliest option pricing models originated by Black and Scholes [1] and Merton [18] use the Geome...
We analyze the efficiency properties of a numerical pricing method based on Fourier-cosine expansion...
The Fourier transform is an important tool in Financial Economics. It delivers real time pricing whi...
The aim of this article is to provide a systematic analysis of the conditions such that Fourier tran...
This thesis develops a generic framework based on the Fourier transform for pricing and hedging of v...
This paper develops a non-finite-difference-based method of American option pricing under stochastic...
The fast Fourier transform (FFT), even though it has been widely applicable in Physics and Engineeri...
A fast and accurate method for pricing early exercise and certain exotic options in computational fi...
Abstract. A fast and accurate method for pricing early exercise and certain exotic options in comput...
This paper is concerned with fast Fourier transform (FFT) approach to option valuation, where the un...
This paper describes a fast, flexible numerical technique to price American options and generate the...
Options with extendable features have many applications in finance and these provide the motivation ...
This note presents a simple, robust and computationally efficient way to calculate expectations of a...
textabstractIn this overview chapter, we will discuss the use of exponentially converging option pri...
A model for valuing a European-style commodity option and a futures option is discussed with a view ...
The earliest option pricing models originated by Black and Scholes [1] and Merton [18] use the Geome...
We analyze the efficiency properties of a numerical pricing method based on Fourier-cosine expansion...
The Fourier transform is an important tool in Financial Economics. It delivers real time pricing whi...
The aim of this article is to provide a systematic analysis of the conditions such that Fourier tran...
This thesis develops a generic framework based on the Fourier transform for pricing and hedging of v...
This paper develops a non-finite-difference-based method of American option pricing under stochastic...