Add to ORKGWe develop a new method for pricing options on discretely sampled arithmetic average in exponential Lévy models. The main idea is the reduction to a backward induction procedure for the difference Wn between the Asian option with averaging over n sampling periods and the price of the European option with maturity one period. This allows for an efficient truncation of the state space. At each step of backward induction, Wn is calculated accurately and fast using a piece-wise interpolation or splines, fast convolution and either flat iFT and (refined) iFFT or the parabolic iFT. Numerical results demonstrate the advantages of the method
For discrete arithmetic Asian options the payoff depends on the price average of the underlying asse...
We present methodologies to price discretely monitored Asian options when the underlying evolves acc...
We present a new methodology based on maturity randomization to price discretely monitored arithmeti...
We develop a new method for pricing options on discretely sampled arithmetic average in exponential ...
ABSTRACT. We develop a new method for pricing options on discretely sampled arithmetic average in ex...
Abstract. We suggest an improved FFT pricing algorithm for dis-cretely sampled Asian options with ge...
We propose an accurate method for pricing arithmetic Asian options on the discrete or continuous ave...
Asian options represent an important subclass of the path-dependent contracts that are identified by...
In this paper, we investigate two numerical methods for pricing Asian options: Laplace transform in...
INST: L_200In this paper, we present selected methods to price average price options (also known as ...
We suggest an improved FFT pricing algorithm for discretely sampled Asian options with general indep...
We compute analytical formulae for pricing arithmetic Asian options under jump diffusion CIR process...
Bounds for the price of discretely sampled arithmetic Asian options In this paper the pricing of dis...
Pricing Asian options is a long-standing hard problem; there is no analytical formula for the probab...
We propose an efficient pricing method for arithmetic and geometric Asian options under exponential ...
For discrete arithmetic Asian options the payoff depends on the price average of the underlying asse...
We present methodologies to price discretely monitored Asian options when the underlying evolves acc...
We present a new methodology based on maturity randomization to price discretely monitored arithmeti...
We develop a new method for pricing options on discretely sampled arithmetic average in exponential ...
ABSTRACT. We develop a new method for pricing options on discretely sampled arithmetic average in ex...
Abstract. We suggest an improved FFT pricing algorithm for dis-cretely sampled Asian options with ge...
We propose an accurate method for pricing arithmetic Asian options on the discrete or continuous ave...
Asian options represent an important subclass of the path-dependent contracts that are identified by...
In this paper, we investigate two numerical methods for pricing Asian options: Laplace transform in...
INST: L_200In this paper, we present selected methods to price average price options (also known as ...
We suggest an improved FFT pricing algorithm for discretely sampled Asian options with general indep...
We compute analytical formulae for pricing arithmetic Asian options under jump diffusion CIR process...
Bounds for the price of discretely sampled arithmetic Asian options In this paper the pricing of dis...
Pricing Asian options is a long-standing hard problem; there is no analytical formula for the probab...
We propose an efficient pricing method for arithmetic and geometric Asian options under exponential ...
For discrete arithmetic Asian options the payoff depends on the price average of the underlying asse...
We present methodologies to price discretely monitored Asian options when the underlying evolves acc...
We present a new methodology based on maturity randomization to price discretely monitored arithmeti...