We apply a new numerical method, the singular Fourier-Pad ́e (SFP) method invented by Driscoll and Fornberg (2001, 2011), to price European-type options in L ́evy and affine processes. The motivation behind this application is to reduce the inefficiency of current Fourier techniques when they are used to approximate piecewise continuous (non-smooth) probability density functions. When techniques such as fast Fourier transforms and Fourier series are applied to price and hedge options with non-smooth prob- ability density functions, they cause the Gibbs phenomenon; accordingly, the techniques converge slowly for density functions with jumps in value or derivatives. This seriously adversely affects the efficiency and accuracy of ...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
The goal of this paper is to investigate the method outlined by one of us (P. R.) in Cherubini, U., ...
This thesis focuses on the numerical calculation of fluctuation identities with both dis- crete and ...
Highly accurate approximation pricing formulae and option Greeks are obtained for European-type opti...
Here we develop an option pricing method for European options based on the Fourier-cosine series, an...
This paper extends the singular Fourier–Padé (SFP) method proposed by Chan [Singular Fourier–Padé se...
We introduce a new numerical method called the complex Fourier series (CFS) method proposed by Chan ...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
Abstract. Here we develop an option pricing method for European options based on the Fourier-cosine ...
This paper investigates several competing procedures for computing the prices of vanilla European op...
We discuss the efficiency of the spectral method for computing the value of the European Call Options,...
Here we develop an option pricing method for European options based on the Fourier-cosine series, an...
We present a new efficient and robust framework for European option pricing under continuous-time as...
This paper investigates several competing procedures for computing the prices of vanilla Euro-pean o...
This thesis develops a generic framework based on the Fourier transform for pricing and hedging of v...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
The goal of this paper is to investigate the method outlined by one of us (P. R.) in Cherubini, U., ...
This thesis focuses on the numerical calculation of fluctuation identities with both dis- crete and ...
Highly accurate approximation pricing formulae and option Greeks are obtained for European-type opti...
Here we develop an option pricing method for European options based on the Fourier-cosine series, an...
This paper extends the singular Fourier–Padé (SFP) method proposed by Chan [Singular Fourier–Padé se...
We introduce a new numerical method called the complex Fourier series (CFS) method proposed by Chan ...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
Abstract. Here we develop an option pricing method for European options based on the Fourier-cosine ...
This paper investigates several competing procedures for computing the prices of vanilla European op...
We discuss the efficiency of the spectral method for computing the value of the European Call Options,...
Here we develop an option pricing method for European options based on the Fourier-cosine series, an...
We present a new efficient and robust framework for European option pricing under continuous-time as...
This paper investigates several competing procedures for computing the prices of vanilla Euro-pean o...
This thesis develops a generic framework based on the Fourier transform for pricing and hedging of v...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
The goal of this paper is to investigate the method outlined by one of us (P. R.) in Cherubini, U., ...
This thesis focuses on the numerical calculation of fluctuation identities with both dis- crete and ...