Three processes reflecting persistence of volatility are initially formulated by evaluating three Lévy processes at a time change given by the integral of a mean-reverting square root process. The model for the mean-reverting time change is then generalized to include non-Gaussian models that are solutions to Ornstein-Uhlenbeck equations driven by one-sided discontinuous Lévy processes permitting correlation with the stock. Positive stock price processes are obtained by exponentiating and mean correcting these processes, or alternatively by stochastically exponentiating these processes. The characteristic functions for the log price can be used to yield option prices via the fast Fourier transform. In general mean-corrected exponentiation p...
As is well known, the classic BlackScholes option pricing model assumes that returns follow Brownia...
In this paper, we examine the stochastic volatility model of Schobel and Zhu (1999) where volatility...
The paper Exotic Option Pricing in Stochastic Volatility Levy Models and with Fractional Brownian M...
Three processes reflecting persistence of volatility are initially formulated by evaluating three Lé...
Three processes reecting persistence of volatility are formulated by evaluating three Levy processes...
Continuous-time stochastic volatility models are becoming an increasingly popular way to describe mo...
Modeling the stock price development as a geometric Brownian motion or, more generally, as a stochas...
Non-Gaussian Ornstein-Uhlenbeck processes allow to model several distributional features of assets’ ...
This report investigates several stochastic processes used for pricing European call options. The pu...
In this thesis we consider a stochastic volatility model based on non-Gaussian Ornstein-Uhlenbeck pr...
Le;vy processes form a wide and rich class of random process, and have many applications ranging fro...
The aim of this paper is to investigate the properties of stochastic volatility models, and to discu...
We study Ornstein-Uhlenbeck stochastic processes driven by Lévy processes, and extend them to more g...
The goal of the paper is to show that some types of Levy processes such as the hyperbolic motion and...
Continuous-time stochastic volatility models are becoming an increasingly popular way to describe mo...
As is well known, the classic BlackScholes option pricing model assumes that returns follow Brownia...
In this paper, we examine the stochastic volatility model of Schobel and Zhu (1999) where volatility...
The paper Exotic Option Pricing in Stochastic Volatility Levy Models and with Fractional Brownian M...
Three processes reflecting persistence of volatility are initially formulated by evaluating three Lé...
Three processes reecting persistence of volatility are formulated by evaluating three Levy processes...
Continuous-time stochastic volatility models are becoming an increasingly popular way to describe mo...
Modeling the stock price development as a geometric Brownian motion or, more generally, as a stochas...
Non-Gaussian Ornstein-Uhlenbeck processes allow to model several distributional features of assets’ ...
This report investigates several stochastic processes used for pricing European call options. The pu...
In this thesis we consider a stochastic volatility model based on non-Gaussian Ornstein-Uhlenbeck pr...
Le;vy processes form a wide and rich class of random process, and have many applications ranging fro...
The aim of this paper is to investigate the properties of stochastic volatility models, and to discu...
We study Ornstein-Uhlenbeck stochastic processes driven by Lévy processes, and extend them to more g...
The goal of the paper is to show that some types of Levy processes such as the hyperbolic motion and...
Continuous-time stochastic volatility models are becoming an increasingly popular way to describe mo...
As is well known, the classic BlackScholes option pricing model assumes that returns follow Brownia...
In this paper, we examine the stochastic volatility model of Schobel and Zhu (1999) where volatility...
The paper Exotic Option Pricing in Stochastic Volatility Levy Models and with Fractional Brownian M...