We develop a qualitative and quantitative analysis on stochastic volatility models. These models represents a wide known class of models among financial mathematics for the evaluation of options and complex derivatives, starting from the fundamental paper of S.L. Heston (1993, The Review of Financial Studies). Moreover, this thesis proposes an interesting researches on both theoretical studies (extending some recent presented results, as those obtained in Costantini et al. (2012) on Finance and Stochastics) on the solution of Dirichlet problem associated and numerical studies, implementing the ADI methods for the approximation of solution and the model calibration by real data taken from real market. Moreover, we propose a weighted average ...
Financial Markets is an interesting wide range area of research in Financial Engineering. In this th...
Due to the development of the pricing theory, options, as one of the most important financial deriva...
The purpose of this thesis is to review the evidence of non-constant volatility and to consider the ...
Stochastic volatility models are used in mathematical finance to describe the dynamics of asset pric...
Many numerical aspects are involved in parameter estimation of stochastic volatility models. We inve...
In this paper we develop a general method for deriving closed-form approximations of European option...
This paper examines alternative methods for pricing options when the underlying security volatilit...
We consider a stochastic volatility model proposed by Moretto, Pasquali and Trivellato (2004) and ma...
We introduce an explicitly solvable multiscale stochastic volatility model that generalizes the Hest...
We introduce an explicitly solvable multiscale stochastic volatility model that generalizes the Hest...
Options are an important building block of modern financial markets. The theory underlying their val...
We introduce an explicitly solvable multiscale stochastic volatility model that generalizes the Hest...
Financial Markets is an interesting wide range area of research in Financial Engineering. In this th...
Due to the development of the pricing theory, options, as one of the most important financial deriva...
The purpose of this thesis is to review the evidence of non-constant volatility and to consider the ...
Stochastic volatility models are used in mathematical finance to describe the dynamics of asset pric...
Many numerical aspects are involved in parameter estimation of stochastic volatility models. We inve...
In this paper we develop a general method for deriving closed-form approximations of European option...
This paper examines alternative methods for pricing options when the underlying security volatilit...
We consider a stochastic volatility model proposed by Moretto, Pasquali and Trivellato (2004) and ma...
We introduce an explicitly solvable multiscale stochastic volatility model that generalizes the Hest...
We introduce an explicitly solvable multiscale stochastic volatility model that generalizes the Hest...
Options are an important building block of modern financial markets. The theory underlying their val...
We introduce an explicitly solvable multiscale stochastic volatility model that generalizes the Hest...
Financial Markets is an interesting wide range area of research in Financial Engineering. In this th...
Due to the development of the pricing theory, options, as one of the most important financial deriva...
The purpose of this thesis is to review the evidence of non-constant volatility and to consider the ...