We consider the problem of pricing European exotic path-dependent derivatives on an underlying described by the Heston stochastic volatility model. Lipton has found a closed form integral representation of the joint transition probability density function of underlying price and variance in the Heston model. We give a convenient numerical approximation of this formula and we use the obtained approximated transition probability density function to price discrete path-dependent options as discounted expectations. The expected value of the payoff is calculated evaluating an integral with the Monte Carlo method using a variance reduction technique based on a suitable approximation of the transition probability density function of the Heston mod...
We introduce a refined tree method to compute option prices using the stochastic volatility model of...
In this paper we propose two new representation formulas for the conditional marginal probability de...
The thesis considers the pricing of European path-dependent options in a multi-dimensional Black-Sch...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying descr...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying desc...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying descr...
We focus on closed-form option pricing in Hestons stochastic volatility model, where closedform form...
Abstract The stochastic volatility model of Heston [6] has been accepted by many practitioners for p...
This paper presents a numerical method to price European options on realized variance. A European re...
In the collocating volatility (CLV) model, the stochastic collocation technique is used as a conveni...
We present a path integral method to derive closed-form solutions for option prices in a stochastic ...
The Heston model is a partial differential equation which is used to price options and is a further ...
Heston (1993) presents a method to derive a closed-form solution for derivative pricing when the vol...
We introduce a refined tree method to compute option prices using the stochastic volatility model of...
A stochastic volatility jump-diffusion model for pricing derivatives with jumps in both spot return ...
We introduce a refined tree method to compute option prices using the stochastic volatility model of...
In this paper we propose two new representation formulas for the conditional marginal probability de...
The thesis considers the pricing of European path-dependent options in a multi-dimensional Black-Sch...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying descr...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying desc...
We consider the problem of pricing European exotic path-dependent derivatives on an underlying descr...
We focus on closed-form option pricing in Hestons stochastic volatility model, where closedform form...
Abstract The stochastic volatility model of Heston [6] has been accepted by many practitioners for p...
This paper presents a numerical method to price European options on realized variance. A European re...
In the collocating volatility (CLV) model, the stochastic collocation technique is used as a conveni...
We present a path integral method to derive closed-form solutions for option prices in a stochastic ...
The Heston model is a partial differential equation which is used to price options and is a further ...
Heston (1993) presents a method to derive a closed-form solution for derivative pricing when the vol...
We introduce a refined tree method to compute option prices using the stochastic volatility model of...
A stochastic volatility jump-diffusion model for pricing derivatives with jumps in both spot return ...
We introduce a refined tree method to compute option prices using the stochastic volatility model of...
In this paper we propose two new representation formulas for the conditional marginal probability de...
The thesis considers the pricing of European path-dependent options in a multi-dimensional Black-Sch...