The area of modeling stochastic volatility using continuous time models has a long history and is always an interesting and vibrant area in financial mathematics, where the dynamic of the asset is a diffusion driven by Brownian motion and the dynamic of the volatility is associated with a diffusion driven also by another Brownian motion, instead of a fixed constant as in Black-Scholes model. However recent works have pointed out that there are some observations that the semimartinagales or Markovian models cannot explain, for example volatility persistence or the roughness of the sample paths of volatilities. And that is when the fractional stochastic volatility models are introduced. Our work about fractional stochastic volatility models m...
In the option pricing literature, it is well known that (i) the decrease in the smile amplitude is m...
The standard Black-Scholes model is a continuous time model to predict asset movement. For the stand...
In quantitative finance, modeling the volatility structure of underlying assets is vital to pricing ...
It is commonly accepted that certain financial data exhibit long-range dependence. We consider a con...
We investigate the problem of pricing derivatives under a fractional stochastic volatility model. We...
We study the probabilistic properties of the fractional Ornstein–Uhlenbeck process, which is a relev...
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 treat the problem of option pricing under a stochastic volatility model that exhibits long-range ...
We establish double Heston model with approximative fractional stochastic volatility in this article...
We consider rough stochastic volatility models where the variance process satisfies a stochastic Vol...
The paper Exotic Option Pricing in Stochastic Volatility Levy Models and with Fractional Brownian M...
We extend the currently most popular models for the volatility of financial time se-ries, Ornstein-U...
We consider rough stochastic volatility models where the variance process satisfies a stochastic Vol...
In this thesis, we investigate the roughness feature within realised volatility for different finan...
In the option pricing literature, it is well known that (i) the decrease in the smile amplitude is m...
The standard Black-Scholes model is a continuous time model to predict asset movement. For the stand...
In quantitative finance, modeling the volatility structure of underlying assets is vital to pricing ...
It is commonly accepted that certain financial data exhibit long-range dependence. We consider a con...
We investigate the problem of pricing derivatives under a fractional stochastic volatility model. We...
We study the probabilistic properties of the fractional Ornstein–Uhlenbeck process, which is a relev...
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 treat the problem of option pricing under a stochastic volatility model that exhibits long-range ...
We establish double Heston model with approximative fractional stochastic volatility in this article...
We consider rough stochastic volatility models where the variance process satisfies a stochastic Vol...
The paper Exotic Option Pricing in Stochastic Volatility Levy Models and with Fractional Brownian M...
We extend the currently most popular models for the volatility of financial time se-ries, Ornstein-U...
We consider rough stochastic volatility models where the variance process satisfies a stochastic Vol...
In this thesis, we investigate the roughness feature within realised volatility for different finan...
In the option pricing literature, it is well known that (i) the decrease in the smile amplitude is m...
The standard Black-Scholes model is a continuous time model to predict asset movement. For the stand...
In quantitative finance, modeling the volatility structure of underlying assets is vital to pricing ...