This thesis develops a generic framework based on the Fourier transform for pricing and hedging of various options in equity, commodity, currency, and insurance markets. The pricing problem can be reduced to solving a partial integro-differential equation (PIDE). The Fourier Space Time-stepping (FST) framework developed in this thesis circumvents the problems associated with the existing finite difference methods by utilizing the Fourier transform to solve the PIDE. The FST framework-based methods are generic, highly efficient and rapidly convergent. The Fourier transform can be applied to the pricing PIDE to obtain a linear system of ordinary differential equations that can be solved explicitly. Solving the PIDE in Fourier space allows ...
The aim of this article is to provide a systematic analysis of the conditions such that Fourier tran...
We apply a new numerical method, the singular Fourier-Pad ́e (SFP) method invented by Driscoll and F...
textabstractIn this overview chapter, we will discuss the use of exponentially converging option pri...
This thesis develops a generic framework based on the Fourier transform for pricing and hedging of v...
Although jump-diffusion and Lévy models have been widely used in industry, the resulting pricing par...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
A fast and accurate method for pricing early exercise and certain exotic options in computational fi...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
We present a new efficient and robust framework for European option pricing under continuous-time as...
This paper describes a fast, flexible numerical technique to price American options and generate the...
This thesis focuses on the numerical calculation of fluctuation identities with both dis- crete and ...
This paper develops a Fourier transform method with an asymptotic expansion approach for option pric...
Abstract. A fast and accurate method for pricing early exercise and certain exotic options in comput...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
We develop an efficient Fourier-based numerical method for pricing Bermudan and discretely monitored...
The aim of this article is to provide a systematic analysis of the conditions such that Fourier tran...
We apply a new numerical method, the singular Fourier-Pad ́e (SFP) method invented by Driscoll and F...
textabstractIn this overview chapter, we will discuss the use of exponentially converging option pri...
This thesis develops a generic framework based on the Fourier transform for pricing and hedging of v...
Although jump-diffusion and Lévy models have been widely used in industry, the resulting pricing par...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
A fast and accurate method for pricing early exercise and certain exotic options in computational fi...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
We present a new efficient and robust framework for European option pricing under continuous-time as...
This paper describes a fast, flexible numerical technique to price American options and generate the...
This thesis focuses on the numerical calculation of fluctuation identities with both dis- crete and ...
This paper develops a Fourier transform method with an asymptotic expansion approach for option pric...
Abstract. A fast and accurate method for pricing early exercise and certain exotic options in comput...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
We develop an efficient Fourier-based numerical method for pricing Bermudan and discretely monitored...
The aim of this article is to provide a systematic analysis of the conditions such that Fourier tran...
We apply a new numerical method, the singular Fourier-Pad ́e (SFP) method invented by Driscoll and F...
textabstractIn this overview chapter, we will discuss the use of exponentially converging option pri...