In this paper, we propose a fractional stochastic volatility jump-diffusion model which extends the Bates(1996) model. Where we model the volatility as a fractional process. Extensive empirical studies show that the distributions of the logarithmic returns of financial asset usually exhibit properties of self-similarity and long-range dependence and since the fractional Brownian motion has these two important properties, it has the ability to capture the behavior of underlying asset price. Further incorporating jumps into the stochastic volatility framework gives further freedom to financial mathematicians to fit both the short and long end of the implied volatility surface. We propose a stochastic model which contains both fractional and j...
The Black-Scholes model has been widely used in option pricing for roughly four decades. However, th...
Abstract. This work investigates financial models for option pricing, interest rates and credit risk...
We study a market model in which the volatility of the stock may jump at a random time from a fixed...
Abstract: Problem statement: We presented option pricing when the stock prices follows a jump-diffus...
We investigate the European call option pricing problem under the fractional stochastic volatility m...
The paper Exotic Option Pricing in Stochastic Volatility Levy Models and with Fractional Brownian M...
In this paper, we introduce a unifying approach to option pricing under continuous-time stochastic v...
We establish double Heston model with approximative fractional stochastic volatility in this article...
We extend the stochastic volatility model in Moretto et al. [MPT05] to a stochastic volatility jump-...
Empirical evidence shows that single-factor stochastic volatility models are not flexible enough to ...
Title: Black-Scholes Models of Option Pricing Author: Martin Cekal Department: Department of Probabi...
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...
Abstract. Assume that the underlying asset price follows the fractional jump-diffusion process, the ...
Most of the recent literature dealing with the modeling of financial assets assumes that the underl...
The Black-Scholes model has been widely used in option pricing for roughly four decades. However, th...
Abstract. This work investigates financial models for option pricing, interest rates and credit risk...
We study a market model in which the volatility of the stock may jump at a random time from a fixed...
Abstract: Problem statement: We presented option pricing when the stock prices follows a jump-diffus...
We investigate the European call option pricing problem under the fractional stochastic volatility m...
The paper Exotic Option Pricing in Stochastic Volatility Levy Models and with Fractional Brownian M...
In this paper, we introduce a unifying approach to option pricing under continuous-time stochastic v...
We establish double Heston model with approximative fractional stochastic volatility in this article...
We extend the stochastic volatility model in Moretto et al. [MPT05] to a stochastic volatility jump-...
Empirical evidence shows that single-factor stochastic volatility models are not flexible enough to ...
Title: Black-Scholes Models of Option Pricing Author: Martin Cekal Department: Department of Probabi...
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...
Abstract. Assume that the underlying asset price follows the fractional jump-diffusion process, the ...
Most of the recent literature dealing with the modeling of financial assets assumes that the underl...
The Black-Scholes model has been widely used in option pricing for roughly four decades. However, th...
Abstract. This work investigates financial models for option pricing, interest rates and credit risk...
We study a market model in which the volatility of the stock may jump at a random time from a fixed...