This paper presents an algorithm for a complete and e cient calibration of the Heston stochastic volatility model. We express the calibration as a nonlinear least-squares problem. We exploit a suitable representation of the Heston characteristic function and modify it to avoid discontinuities caused by branch switchings of complex functions. Using this representation, we obtain the analytical gradient of the price of a vanilla option with respect to the model parameters, which is the key element of all variants of the objective function. The interdependency between the components of the gradient enables an e cient implementation which is around ten times faster than a numerical gradient. We choose the Levenberg-Marquardt method to calibrate...
In this article we propose an efficient Monte Carlo scheme for simulating the stochastic volatility ...
The quadratic rough Heston model provides a natural way to encode Zumbach effect in the rough volati...
The calibration of model parameters is a crucial step in the process of valuation of complex derivat...
This paper presents an algorithm for a complete and efficient calibration of the Heston stochastic v...
The Heston model is a well-known two-dimensional financial model. Since the Heston model contains im...
The two most popular equity derivatives pricing models among practitioners are the local volatility ...
We propose to take advantage of the common knowledge of the characteristic function of the swap rate...
In this paper we consider an explicitly solvable multiscale stochastic volatility model that genera...
Treball fi de màster de: Master's Degree in Economics and FinanceDirectors: Filippo Ippolito ; Eulàl...
This paper compares the performance of three methods for pricing vanilla options in models with know...
This paper consists in providing and mathematically analyzing the expansion of an option price (with...
Parameters of equity pricing models, such as the Heston's stochastic volatility model, have to be ca...
In this paper, we propose a new random volatility model, where the volatility has a deterministic te...
The crude assumption on log normal stock returns and constant volatility in the Black-Scholes model ...
International audienceThe use of the Heston model is still challenging because it has a closed formu...
In this article we propose an efficient Monte Carlo scheme for simulating the stochastic volatility ...
The quadratic rough Heston model provides a natural way to encode Zumbach effect in the rough volati...
The calibration of model parameters is a crucial step in the process of valuation of complex derivat...
This paper presents an algorithm for a complete and efficient calibration of the Heston stochastic v...
The Heston model is a well-known two-dimensional financial model. Since the Heston model contains im...
The two most popular equity derivatives pricing models among practitioners are the local volatility ...
We propose to take advantage of the common knowledge of the characteristic function of the swap rate...
In this paper we consider an explicitly solvable multiscale stochastic volatility model that genera...
Treball fi de màster de: Master's Degree in Economics and FinanceDirectors: Filippo Ippolito ; Eulàl...
This paper compares the performance of three methods for pricing vanilla options in models with know...
This paper consists in providing and mathematically analyzing the expansion of an option price (with...
Parameters of equity pricing models, such as the Heston's stochastic volatility model, have to be ca...
In this paper, we propose a new random volatility model, where the volatility has a deterministic te...
The crude assumption on log normal stock returns and constant volatility in the Black-Scholes model ...
International audienceThe use of the Heston model is still challenging because it has a closed formu...
In this article we propose an efficient Monte Carlo scheme for simulating the stochastic volatility ...
The quadratic rough Heston model provides a natural way to encode Zumbach effect in the rough volati...
The calibration of model parameters is a crucial step in the process of valuation of complex derivat...