This paper compares the performance of three methods for pricing vanilla options in models with known characteristic function: (1) Direct integration, (2) Fast Fourier Transform (FFT), (3) Fractional FFT. The most important application of this com-parison is the choice of the fastest method for the calibration of stochastic volatility models, e.g. Heston, Bates, Barndorff-Nielsen-Shephard models or Levy models with stochastic time. We show that using additional cache technique makes the calibration with the direct integration method at least seven times faster than the calibration with the fractional FFT method. JEL Classification: G1
This dissertation is devoted to high performance numerical methods for option valuation and model ca...
It is argued that the growth in the breadth of option strikes traded after the financial crisis of 2...
Abstract. We present a new numerical method to price vanilla options quickly in time-changed Brownia...
This paper compares the performance of three methods for pricing vanilla options in models with know...
This paper compares the performance of three methods for pricing vanilla options in models with know...
This paper compares the performance of three methods for pricing vanilla options in models with know...
We present a new numerical method to price vanilla options quickly in time-changed Brownian motion m...
In this thesis, stochastic volatility models with Lévy processes are treated in parameter calibrati...
In this paper we propose the first calibration exercise based on quantization methods. Pricing and c...
Using a data set of vanilla options on the major indexes we investigate the calibration properties o...
Many numerical aspects are involved in parameter estimation of stochastic volatility models. We inve...
In this thesis, stochastic volatility models with Levy processes are treated in parameter calibrati...
We present an acceleration technique, effective for explicit finite difference schemes describing d...
Spread options are notoriously difficult to price without the use of Monte Carlo simulation. Some s...
In this paper, we propose a new random volatility model, where the volatility has a deterministic te...
This dissertation is devoted to high performance numerical methods for option valuation and model ca...
It is argued that the growth in the breadth of option strikes traded after the financial crisis of 2...
Abstract. We present a new numerical method to price vanilla options quickly in time-changed Brownia...
This paper compares the performance of three methods for pricing vanilla options in models with know...
This paper compares the performance of three methods for pricing vanilla options in models with know...
This paper compares the performance of three methods for pricing vanilla options in models with know...
We present a new numerical method to price vanilla options quickly in time-changed Brownian motion m...
In this thesis, stochastic volatility models with Lévy processes are treated in parameter calibrati...
In this paper we propose the first calibration exercise based on quantization methods. Pricing and c...
Using a data set of vanilla options on the major indexes we investigate the calibration properties o...
Many numerical aspects are involved in parameter estimation of stochastic volatility models. We inve...
In this thesis, stochastic volatility models with Levy processes are treated in parameter calibrati...
We present an acceleration technique, effective for explicit finite difference schemes describing d...
Spread options are notoriously difficult to price without the use of Monte Carlo simulation. Some s...
In this paper, we propose a new random volatility model, where the volatility has a deterministic te...
This dissertation is devoted to high performance numerical methods for option valuation and model ca...
It is argued that the growth in the breadth of option strikes traded after the financial crisis of 2...
Abstract. We present a new numerical method to price vanilla options quickly in time-changed Brownia...