In this article, we propose an efficient pricing method for Asian options with early–exercise features. It is based on a two–dimensional integration and a backward recursion of the Fourier coefficients, in which several numerical techniques, like Fourier cosine expansions, Clenshaw–Curtis quadrature and the Fast Fourier transform (FFT) are employed. Rapid convergence of the pricing method is illustrated by an error analysis. Its performance is further demonstrated by various numerical examples, where we also show the power of an implementation on the Graphics Processing Unit (GPU).Electrical Engineering, Mathematics and Computer Scienc
© 2016 Australian Mathematical Society. The problem of pricing arithmetic Asian options is nontrivia...
We analyze the efficiency properties of a numerical pricing method based on Fourier-cosine expansion...
In this paper, we investigate two numerical methods for pricing Asian options: Laplace transform in...
We propose an efficient pricing method for arithmetic and geometric Asian options under exponential ...
We propose an efficient pricing method for arithmetic, and geometric, Asian options under Levy proce...
This thesis investigates the fast Fourier transform-based pricing algorithm for discrete Asian optio...
The acceleration of an option pricing technique based on Fourier cosine expansions on the Graphics P...
The acceleration of an option pricing technique based on Fourier cosine expansions on the Graphics P...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
We propose an efficient pricing method for arithmetic Asian options based on Fourier-cosine expansio...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
Pricing Asian options is a long-standing hard problem; there is no analytical formula for the probab...
In the financial world, two tasks are of prime importance: model calibration and portfolio hedging. ...
The problem of pricing arithmetic Asian options is nontrivial, and has attracted much interest over ...
In this thesis I combine the strengths of the Path Integration method and the Fast Fourier transform...
© 2016 Australian Mathematical Society. The problem of pricing arithmetic Asian options is nontrivia...
We analyze the efficiency properties of a numerical pricing method based on Fourier-cosine expansion...
In this paper, we investigate two numerical methods for pricing Asian options: Laplace transform in...
We propose an efficient pricing method for arithmetic and geometric Asian options under exponential ...
We propose an efficient pricing method for arithmetic, and geometric, Asian options under Levy proce...
This thesis investigates the fast Fourier transform-based pricing algorithm for discrete Asian optio...
The acceleration of an option pricing technique based on Fourier cosine expansions on the Graphics P...
The acceleration of an option pricing technique based on Fourier cosine expansions on the Graphics P...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
We propose an efficient pricing method for arithmetic Asian options based on Fourier-cosine expansio...
We present a pricing method based on Fourier-cosine expansions for early-exercise and discretely-mon...
Pricing Asian options is a long-standing hard problem; there is no analytical formula for the probab...
In the financial world, two tasks are of prime importance: model calibration and portfolio hedging. ...
The problem of pricing arithmetic Asian options is nontrivial, and has attracted much interest over ...
In this thesis I combine the strengths of the Path Integration method and the Fast Fourier transform...
© 2016 Australian Mathematical Society. The problem of pricing arithmetic Asian options is nontrivia...
We analyze the efficiency properties of a numerical pricing method based on Fourier-cosine expansion...
In this paper, we investigate two numerical methods for pricing Asian options: Laplace transform in...