The paper Exotic Option Pricing in Stochastic Volatility Levy Models and with Fractional Brownian Motion aims on extending the restrictive Black-Scholes model by allowing volatility to evolve randomly. These models are used to price exotic derivatives and certificates. The first stochastic volatility model is the Heston model. In order to capture jumps in volatility and stock evolution, Levy processes and Ornstein-Uhlenbeck processes are under discussion. Using the convenient features of Levy processes, a stochastic volatility stock evolution model, where volatility is driven by a Levy process and volatility evolution and stock evolution are linked, is introduced.This model is named after Barndorff-Nielsen and Shephard (BNS for short). Ho...
In this thesis I will present my PhD research work, focusing mainly on financial modelling of asset’...
Three processes reecting persistence of volatility are formulated by evaluating three Levy processes...
We consider fractional Ornstein–Uhlenbeck process as well as fractional CIR-process with Hurst index...
In this paper, we propose a fractional stochastic volatility jump-diffusion model which extends the ...
We establish double Heston model with approximative fractional stochastic volatility in this article...
Mestrado em Matemática FinanceiraPrices fluctuations in markets, both liquid and illiquid, exhibit d...
We treat the problem of option pricing under a stochastic volatility model that exhibits long-range ...
We investigate the problem of pricing derivatives under a fractional stochastic volatility model. We...
The area of modeling stochastic volatility using continuous time models has a long history and is al...
© 2011 Dr. Stephen Seunghwan ChinThis thesis is concerned with stochastic volatility models and pric...
Title: Black-Scholes Models of Option Pricing Author: Martin Cekal Department: Department of Probabi...
It is commonly accepted that certain financial data exhibit long-range dependence. We consider a con...
We investigate the European call option pricing problem under the fractional stochastic volatility m...
This paper examines the pricing of options by approximating extensions of the Black-Scholes setup in...
This paper presents an enhanced model of geometric fractional Brownian motion where its volatility ...
In this thesis I will present my PhD research work, focusing mainly on financial modelling of asset’...
Three processes reecting persistence of volatility are formulated by evaluating three Levy processes...
We consider fractional Ornstein–Uhlenbeck process as well as fractional CIR-process with Hurst index...
In this paper, we propose a fractional stochastic volatility jump-diffusion model which extends the ...
We establish double Heston model with approximative fractional stochastic volatility in this article...
Mestrado em Matemática FinanceiraPrices fluctuations in markets, both liquid and illiquid, exhibit d...
We treat the problem of option pricing under a stochastic volatility model that exhibits long-range ...
We investigate the problem of pricing derivatives under a fractional stochastic volatility model. We...
The area of modeling stochastic volatility using continuous time models has a long history and is al...
© 2011 Dr. Stephen Seunghwan ChinThis thesis is concerned with stochastic volatility models and pric...
Title: Black-Scholes Models of Option Pricing Author: Martin Cekal Department: Department of Probabi...
It is commonly accepted that certain financial data exhibit long-range dependence. We consider a con...
We investigate the European call option pricing problem under the fractional stochastic volatility m...
This paper examines the pricing of options by approximating extensions of the Black-Scholes setup in...
This paper presents an enhanced model of geometric fractional Brownian motion where its volatility ...
In this thesis I will present my PhD research work, focusing mainly on financial modelling of asset’...
Three processes reecting persistence of volatility are formulated by evaluating three Levy processes...
We consider fractional Ornstein–Uhlenbeck process as well as fractional CIR-process with Hurst index...